Good books and lecture notes about category theory.











up vote
159
down vote

favorite
139












What are the best books and lecture notes on category theory?










share|cite|improve this question




















  • 15




    Community wiki?
    – Akhil Mathew
    Jul 21 '10 at 20:23






  • 6




    I can give you an "anti-recommendation": don't get Cameron's "Sets, Logic and Categories". While it's a nice short introduction to some set theory and logic, the final chapter on category theory is too short and not at all well explained. It is however a neat little book for logic and sets...
    – Seamus
    Aug 3 '10 at 13:11






  • 8




    Best with respect to what metric...and for whom? This is a very fuzzy question.
    – Pete L. Clark
    Feb 13 '11 at 7:03






  • 2




    Programmating Reading Guide by Stanford Encyclopedia of Philosophy. It is a supplement to this article.
    – M. Vinay
    Mar 9 '16 at 8:39















up vote
159
down vote

favorite
139












What are the best books and lecture notes on category theory?










share|cite|improve this question




















  • 15




    Community wiki?
    – Akhil Mathew
    Jul 21 '10 at 20:23






  • 6




    I can give you an "anti-recommendation": don't get Cameron's "Sets, Logic and Categories". While it's a nice short introduction to some set theory and logic, the final chapter on category theory is too short and not at all well explained. It is however a neat little book for logic and sets...
    – Seamus
    Aug 3 '10 at 13:11






  • 8




    Best with respect to what metric...and for whom? This is a very fuzzy question.
    – Pete L. Clark
    Feb 13 '11 at 7:03






  • 2




    Programmating Reading Guide by Stanford Encyclopedia of Philosophy. It is a supplement to this article.
    – M. Vinay
    Mar 9 '16 at 8:39













up vote
159
down vote

favorite
139









up vote
159
down vote

favorite
139






139





What are the best books and lecture notes on category theory?










share|cite|improve this question















What are the best books and lecture notes on category theory?







reference-request soft-question category-theory big-list book-recommendation






share|cite|improve this question















share|cite|improve this question













share|cite|improve this question




share|cite|improve this question








edited Sep 3 '14 at 8:38


























community wiki





11 revs, 6 users 60%
Hendrik Brummermann









  • 15




    Community wiki?
    – Akhil Mathew
    Jul 21 '10 at 20:23






  • 6




    I can give you an "anti-recommendation": don't get Cameron's "Sets, Logic and Categories". While it's a nice short introduction to some set theory and logic, the final chapter on category theory is too short and not at all well explained. It is however a neat little book for logic and sets...
    – Seamus
    Aug 3 '10 at 13:11






  • 8




    Best with respect to what metric...and for whom? This is a very fuzzy question.
    – Pete L. Clark
    Feb 13 '11 at 7:03






  • 2




    Programmating Reading Guide by Stanford Encyclopedia of Philosophy. It is a supplement to this article.
    – M. Vinay
    Mar 9 '16 at 8:39














  • 15




    Community wiki?
    – Akhil Mathew
    Jul 21 '10 at 20:23






  • 6




    I can give you an "anti-recommendation": don't get Cameron's "Sets, Logic and Categories". While it's a nice short introduction to some set theory and logic, the final chapter on category theory is too short and not at all well explained. It is however a neat little book for logic and sets...
    – Seamus
    Aug 3 '10 at 13:11






  • 8




    Best with respect to what metric...and for whom? This is a very fuzzy question.
    – Pete L. Clark
    Feb 13 '11 at 7:03






  • 2




    Programmating Reading Guide by Stanford Encyclopedia of Philosophy. It is a supplement to this article.
    – M. Vinay
    Mar 9 '16 at 8:39








15




15




Community wiki?
– Akhil Mathew
Jul 21 '10 at 20:23




Community wiki?
– Akhil Mathew
Jul 21 '10 at 20:23




6




6




I can give you an "anti-recommendation": don't get Cameron's "Sets, Logic and Categories". While it's a nice short introduction to some set theory and logic, the final chapter on category theory is too short and not at all well explained. It is however a neat little book for logic and sets...
– Seamus
Aug 3 '10 at 13:11




I can give you an "anti-recommendation": don't get Cameron's "Sets, Logic and Categories". While it's a nice short introduction to some set theory and logic, the final chapter on category theory is too short and not at all well explained. It is however a neat little book for logic and sets...
– Seamus
Aug 3 '10 at 13:11




8




8




Best with respect to what metric...and for whom? This is a very fuzzy question.
– Pete L. Clark
Feb 13 '11 at 7:03




Best with respect to what metric...and for whom? This is a very fuzzy question.
– Pete L. Clark
Feb 13 '11 at 7:03




2




2




Programmating Reading Guide by Stanford Encyclopedia of Philosophy. It is a supplement to this article.
– M. Vinay
Mar 9 '16 at 8:39




Programmating Reading Guide by Stanford Encyclopedia of Philosophy. It is a supplement to this article.
– M. Vinay
Mar 9 '16 at 8:39










24 Answers
24






active

oldest

votes

















up vote
26
down vote



accepted










Lang's Algebra contains a lot of introductory material on categories, which is really nice since it's done with constant motivation from algebra (e.g. coproducts are introduced right before the free product of groups is discussed).






share|cite|improve this answer



















  • 17




    Lang's algebra also has significant typos that make it frustrating to read if you do not have enough mathematical maturity.
    – user126
    Jul 24 '10 at 11:07






  • 27




    re the typos: this is one instance where buying a used book that someone has marked up can be a really good idea.
    – Isaac
    Jul 24 '10 at 16:08






  • 8




    Bergman has a HUGE (ca 200 pages) companion to Lang's Algebra book math.berkeley.edu/~gbergman/.C.to.L . But even with this companion, I am not really sure if Lang is a good textbook to learn from. It does the right things, but it often does them in sloppy and/or subtly wrong way. I wouldn't say it does very much category theory either.
    – darij grinberg
    Dec 31 '12 at 21:51








  • 5




    I once heard from a rather well-known professor that he and another professor didn't quite get why a proof of a theorem was "obvious". It turned out that it wasn't so obvious, and they wrote an article about the proof. Quite fun. I think Lang has an absolutely fantastic idea of what topics to include, but the exposition is not ideal.
    – Dedalus
    Jun 7 '13 at 10:47


















up vote
41
down vote













Categories for the Working mathematician by Mac Lane



Categories and Sheaves by Kashiwara and Schapira






share|cite|improve this answer



















  • 17




    pfft, only punks read Cat & Sheaves. These lecture notes by Schapira are better: people.math.jussieu.fr/~schapira/lectnotes/AlTo.pdf They use some nice specific examples and problems to develop category theory. With the added bonus of learning some nice alg top along with it. :D:D:D
    – BBischof
    Jul 21 '10 at 23:19






  • 9




    Uh-why do only "punks" read Cat & Sheaves? I happen to think it's a terrific and modern introduction to homological algebra and related fields.
    – Mathemagician1234
    Sep 13 '11 at 18:35






  • 14




    What do you mean by punks? What's wrong with the book. Your comment really made me not want to read the book (especially because it has 7 upvotes, although it doesn't explain anything.
    – Jorge Fernández
    Mar 10 '13 at 17:26






  • 2




    I like Schapira/Kashiwara. But probably not for an introduction
    – Rachmaninoff
    May 27 '16 at 13:17






  • 3




    fwiw, "pfft, only punks ..." sounds like the beginning of a joking remark to me.
    – Soham Chowdhury
    Jan 21 at 16:34


















up vote
33
down vote













And when you get bored of reading, let the Catsters take over. (78 videos on Category theory!)






share|cite|improve this answer






























    up vote
    32
    down vote













    Another book that is more elementary, not requiring any algebraic topology for motivation, and formulating the basics through a question and answer approach is:



    Conceptual Mathematics



    An added benefit is that it is written by an expert!






    share|cite|improve this answer



















    • 5




      Could someone edit this to give the link a name, so people immediately know what is being linked to? It's Lawvere and Schanuel's Conceptual Mathematics. Which is a really wonderful book for learning some category theory if you don't have the background to understand the heavy duty algebraic topology etc examples that enter into some discussions of CT at a very early stage.
      – Seamus
      Aug 3 '10 at 13:07






    • 1




      @Seamus Ok done!
      – BBischof
      Aug 3 '10 at 15:06










    • Are you implying that usually books are not written by experts? :-?
      – Andrea Ferretti
      Aug 22 '10 at 13:24






    • 2




      @Andrea hehe no, but Lawvere is particularly great!
      – BBischof
      Aug 22 '10 at 18:37






    • 8




      One particular prolific author was rumoured to write (and publish) many of his books in order for him to learn their subjects :-)
      – Robin Chapman
      Aug 23 '10 at 18:35


















    up vote
    21
    down vote













    Awodey's new book, while pricey, is a really pleasant read and a good tour of Category Theory from a logician's perspective all the way up to topos theory, with a more up to date view on categories than Mac Lane.






    share|cite|improve this answer



















    • 7




      Peter Smith has criticised Awodey's book for being pitched too high to be an introduction to categories logicmatters.net/2008/06/awodeys-category-theory-ch-1
      – Seamus
      Aug 5 '10 at 10:37






    • 1




      I will admit to having mainly used Awodey as source material while putting together my own introduction to categories lecture course material. As such, it was highly pleasant - but I am not a good example of what a newcomer'll need... haskell.org/haskellwiki/User:Michiexile/MATH198
      – Mikael Vejdemo-Johansson
      Aug 5 '10 at 11:44






    • 1




      +1 for Awodey,which is the only book I would consider to teach category theory to undergraduates.
      – Mathemagician1234
      Sep 13 '11 at 18:39










    • I wanted to add that his book is now available in paperback at half the price of the hardcover edition: Amazon
      – user4536
      May 30 '12 at 18:06


















    up vote
    20
    down vote













    I'm also a fan of Tom Leinster's lecture notes, available on his webpage here. In difficulty level, I would say these are harder than Conceptual Mathematics but easier than Categories and Sheaves, and at a similar level as Categories for the Working Mathematician.






    share|cite|improve this answer



















    • 1




      I discovered those notes recently and in my opinion they are great!
      – Pandora
      Dec 6 '11 at 21:32






    • 1




      He also has a book coming out: Basic Category Theory.
      – J W
      Jul 21 '14 at 19:45






    • 3




      @JW: It's published. See maths.ed.ac.uk/~tl/bct. And it will be available free (online) in January, 2016.
      – eltonjohn
      Aug 9 '14 at 1:46












    • @eltonjohn: Thank you; that's useful to know. I note that it's in arrangement with the publisher and that the book will be both freely downloadable and freely editable.
      – J W
      Aug 9 '14 at 1:58


















    up vote
    18
    down vote













    The nLab is a great resource for category theory.






    share|cite|improve this answer



















    • 21




      I take the OP to be asking about introdutions to category theory. nLab is not a good introductory text...
      – Seamus
      Aug 4 '10 at 7:30






    • 3




      @Seamus You're right. But it's a good general reference, in the same way that wikipedia is a good general reference but shouldn't be used as a text.
      – Kevin H. Lin
      May 4 '13 at 16:03


















    up vote
    15
    down vote













    The first few chapters of Goldblatt's Topoi: the categorial analysis of logic provide another fairly elementary introduction to the basics of category theory.






    share|cite|improve this answer



















    • 3




      Goldblatt's book (which is very beautifully written, by the way) is available online in its entirety here.
      – Hans Lundmark
      Aug 23 '10 at 6:51








    • 1




      I struggled for years to understand category theory until I met Goldblatt's book; then the struggle was over.
      – MJD
      Mar 11 '14 at 0:23


















    up vote
    14
    down vote













    Paolo Aluffi, Algebra: Chapter 0 has category theory woven all through it, particularly in Chapter IX of course. I can tell that randomly sampled pieces of the text are well-written, although I have never systematically read longer parts of it.






    share|cite|improve this answer



















    • 2




      I have gone through this book very carefully. It is indeed an excellent algebra book, but the last chapter is not very good.
      – Hui Yu
      Apr 30 '13 at 6:49




















    up vote
    13
    down vote













    As a young student, I enjoyed Peter Freyd's fun little book on abelian categories (available online as a TAC Reprint). The nice thing about Freyd's book is it isn't boring, and it has little pieces of wisdom (opinion) such as the remark that categories are not really important, you just define them so you can define functors. And in fact you just define functors so you can define natural transformations, the really interesting things.



    Of course you may disagree, but blunt debatable assertions (like this one) always make for more interesting reading. Another provocative remark by this author is the observation that he himself seldom learnt math by reading books, but rather by talking to people.



    From the nice link above I learned that Goldblatt also quotes a remark (which may have inspired Freyd's) by Eilenberg and Maclane that categories are entirely secondary to functors and natural transformations, on page 194 where he introduces these latter concepts.



    Leinster's notes linked by Patrick, look nice - a bit like an introduction to Maclane's Categories for the working mathematician, chatty and full of debatable assertions, (many of which I disagree with, but enjoy thinking about). He does not give much credit, but I believe the adjoint functor theorems he quotes without proof, (GAFT,...) may be due to Freyd. Leinster's notes are easy reading and informative.






    share|cite|improve this answer



















    • 2




      Eilenberg and Mac Lane's original paper: General theory of natural equivalences says that they defined "category" to define "functor", and "functor" to define "natural transformation". But I get the impression that the category theorists of today don't take that remark all that seriously.
      – Uday Reddy
      Dec 7 '13 at 18:44


















    up vote
    12
    down vote













    I've read a fair amount of Sets for Mathematics and found it to be a gentle introduction.



    http://www.amazon.com/Sets-Mathematics-F-William-Lawvere/dp/0521010608/ref=pd_sim_b_5






    share|cite|improve this answer






























      up vote
      11
      down vote













      Emily Riehl's recently published book Category theory in context is a fantastic introductory text for those interested in seeing lots of examples of where category theory arises in various mathematical disciplines. Understand the examples from other branches of mathematics requires some mathematical maturity (e.g., a bit of exposure to algebra and topology), but these examples aren't strictly necessary to understand the category theory; even the less advanced reader should have no problem understanding the categorical content of the text. It stresses the importance of representability, an understanding of which is crucial if the reader wants to go on to learn about $ 2 $-categories in the future. It's elegantly written, well-motivated, uses very clear notation, and overall is refreshingly clear in its exposition.



      The current version of the text is available at http://www.math.jhu.edu/~eriehl/context.pdf and errata in the published version are being updated. The text is new, so it's not as well-known as other texts, but it's so well-written that it seems very likely that it will soon become a mainstay in the world of category theory texts.



      9 July 2017 Edit. Updated the link to the text.






      share|cite|improve this answer






























        up vote
        10
        down vote













        Arbib, Arrows, Structures, and Functors: The Categorical Imperative



        More elementary than MacLane.



        I don't know very much about this, but some stripes of computer scientist have taken an interest in category theory recently, and there are lecture notes floating around with that orientation.






        share|cite|improve this answer






























          up vote
          9
          down vote













          Wikipedia has some nice free texts linked at the bottom. There's an online version of Abstract and Concrete Categories, for example.



          Steve Awodey has some lecture notes available online too. (Awodey's newish book is expensive, but probably rather good)



          Patrick Schultz's answer, and BBischoff's comment on an earlier answer also have good links to freely available resources.






          share|cite|improve this answer






























            up vote
            7
            down vote













            MATH 4135/5135: Introduction to Category Theory by Peter Selinger
            (17pp). Concise course outline. Only wish it covered more topics. Available in PS or PDF format.

            http://www.mscs.dal.ca/~selinger/4135/



            Handbook of Categorical Algebra (Encyclopedia of Mathematics and its Applications) by Francis Borceux. Rigorous. Comprehensive. This is NOT free, but you can see the contents/index/excerpts at the publisher's web site, listed below. This is a three volume set:

            (v. 1) Basic Category Theory, 364pp. (ISBN-13: 9780521441780)

            http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441780


            (v. 2) Categories and Structures, 464pp. (ISBN-13: 9780521441797)

            http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441797


            (v. 3) Sheaf Theory, 544pp. (ISBN-13: 9780521441803)

            http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441803



            Reprints in Theory and Applications of Categories (TAC). This site has 18 books and articles on category theory in PDF, including several by F.W. Lawvere.

            http://www.tac.mta.ca/tac/reprints/index.html



            Abstract and Concrete Categories-The Joy of Cats by Jirı Adamek, Horst Herrlich, and George E. Strecker (524pp). Free PDF. Published under the GNU Free Documentation License. Mentioned already by Seamus in reference to Wikipedia's external links for Category Theory, but worth repeating, because it's very readable.

            http://katmat.math.uni-bremen.de/acc



            A Gentle Introduction to Category Theory (the calculational approach) by Maarten M. Fokkinga (80pp).

            http://wwwhome.cs.utwente.nl/~fokkinga/mmf92b.html






            share|cite|improve this answer






























              up vote
              7
              down vote













              Barr and Wells, in addition to Toposes, Triples and Theories, have written Category Theory for the Computing Sciences, a comprehensive tome which goes through most of the interesting aspects of category theory with a constant explicit drive to relate everything to computer science whenever possible.



              Both books are available online as TAC Reprints.






              share|cite|improve this answer






























                up vote
                5
                down vote













                First Chapter of Jacobson's Basic Algebra -II.






                share|cite|improve this answer






























                  up vote
                  5
                  down vote













                  Last year the book Basic Category Theory by Tom Leinster was published by Cambridge University Press. I think it can serve very well as an introduction to Category Theory. It covers much less than Mac Lane's Categories for a working mathematician, but motivates concepts better.






                  share|cite|improve this answer






























                    up vote
                    3
                    down vote













                    Lawvere, Rosebrugh. Sets for Mathematics.



                    Pierce B. C. Basic category theory for computer scientists.



                    José L. Fiadeiro. Categories for Software Engineering.



                    Martini. Elements of Basic Category Theory.



                    Burstall, Rydeheard. Computational category theory. Requires ML background.






                    share|cite|improve this answer






























                      up vote
                      3
                      down vote













                      "Basic category theory"is a script by Jaap van Oosten from Utrecht university (u can find more scripts on topos theory and intuitionism there).
                      Advanced is Introduction in Higher order categorical logic by Lambek & Scott. The 3 vols. from Borceux aswell as Johnstone: Sketches of an elephant, 1-2 are very readable reference for looking up proofs and technical details. Toposes and local set theories by Bell is availlable in Dover prints.






                      share|cite|improve this answer






























                        up vote
                        3
                        down vote














                        • Appendix of Abstract-Algebra by Dummit & Foote http://www.amazon.com/Abstract-Algebra-Edition-David-Dummit/dp/0471433349

                        • An introduction to Category theory by Harold Simmons http://www.amazon.com/Introduction-Category-Theory-Harold-Simmons/dp/0521283043/

                        • A course in Homological algebra - Hilton and Stammbach http://www.amazon.com/Course-Homological-Algebra-Graduate-Mathematics/dp/0387948236/






                        share|cite|improve this answer






























                          up vote
                          3
                          down vote













                          I'm surprised that this hasn't been mentioned already.



                          "Category Theory: An Introduction" by Herrlich and Strecker. You can find this book in either the Allyn and Bacon Series in Advanced Mathematics or Sigma Series in Pure Mathematics.



                          Herrlich and Strecker co-authored another book called "Abstract and Concrete Categories: The Joy of Cats" which is not nearly as good as the former book.






                          share|cite|improve this answer






























                            up vote
                            3
                            down vote













                            There's also this Category Theory for Programmers by Bartosz Milewski with the companion video lectures



                            https://www.youtube.com/playlist?list=PLbgaMIhjbmEnaH_LTkxLI7FMa2HsnawM_
                            https://www.youtube.com/playlist?list=PLbgaMIhjbmElia1eCEZNvsVscFef9m0dm






                            share|cite|improve this answer























                            • really engaging video lectures with a computer programming (Haskel) bend; I'm not a mathematician but I really enjoyed them enough to look for textbooks on category theory
                              – yosimitsu kodanuri
                              Sep 23 at 10:03


















                            up vote
                            2
                            down vote













                            "Algebra:Rings Modules and Categories" by Carl Faith has alot about category theory,which dos'nt need any topology to understand,but is mixed with all the stuff about algebra,which is also writen in a catigorcal way.






                            share|cite|improve this answer























                              Your Answer





                              StackExchange.ifUsing("editor", function () {
                              return StackExchange.using("mathjaxEditing", function () {
                              StackExchange.MarkdownEditor.creationCallbacks.add(function (editor, postfix) {
                              StackExchange.mathjaxEditing.prepareWmdForMathJax(editor, postfix, [["$", "$"], ["\\(","\\)"]]);
                              });
                              });
                              }, "mathjax-editing");

                              StackExchange.ready(function() {
                              var channelOptions = {
                              tags: "".split(" "),
                              id: "69"
                              };
                              initTagRenderer("".split(" "), "".split(" "), channelOptions);

                              StackExchange.using("externalEditor", function() {
                              // Have to fire editor after snippets, if snippets enabled
                              if (StackExchange.settings.snippets.snippetsEnabled) {
                              StackExchange.using("snippets", function() {
                              createEditor();
                              });
                              }
                              else {
                              createEditor();
                              }
                              });

                              function createEditor() {
                              StackExchange.prepareEditor({
                              heartbeatType: 'answer',
                              convertImagesToLinks: true,
                              noModals: true,
                              showLowRepImageUploadWarning: true,
                              reputationToPostImages: 10,
                              bindNavPrevention: true,
                              postfix: "",
                              imageUploader: {
                              brandingHtml: "Powered by u003ca class="icon-imgur-white" href="https://imgur.com/"u003eu003c/au003e",
                              contentPolicyHtml: "User contributions licensed under u003ca href="https://creativecommons.org/licenses/by-sa/3.0/"u003ecc by-sa 3.0 with attribution requiredu003c/au003e u003ca href="https://stackoverflow.com/legal/content-policy"u003e(content policy)u003c/au003e",
                              allowUrls: true
                              },
                              noCode: true, onDemand: true,
                              discardSelector: ".discard-answer"
                              ,immediatelyShowMarkdownHelp:true
                              });


                              }
                              });














                               

                              draft saved


                              draft discarded


















                              StackExchange.ready(
                              function () {
                              StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fmath.stackexchange.com%2fquestions%2f370%2fgood-books-and-lecture-notes-about-category-theory%23new-answer', 'question_page');
                              }
                              );

                              Post as a guest















                              Required, but never shown

























                              24 Answers
                              24






                              active

                              oldest

                              votes








                              24 Answers
                              24






                              active

                              oldest

                              votes









                              active

                              oldest

                              votes






                              active

                              oldest

                              votes








                              up vote
                              26
                              down vote



                              accepted










                              Lang's Algebra contains a lot of introductory material on categories, which is really nice since it's done with constant motivation from algebra (e.g. coproducts are introduced right before the free product of groups is discussed).






                              share|cite|improve this answer



















                              • 17




                                Lang's algebra also has significant typos that make it frustrating to read if you do not have enough mathematical maturity.
                                – user126
                                Jul 24 '10 at 11:07






                              • 27




                                re the typos: this is one instance where buying a used book that someone has marked up can be a really good idea.
                                – Isaac
                                Jul 24 '10 at 16:08






                              • 8




                                Bergman has a HUGE (ca 200 pages) companion to Lang's Algebra book math.berkeley.edu/~gbergman/.C.to.L . But even with this companion, I am not really sure if Lang is a good textbook to learn from. It does the right things, but it often does them in sloppy and/or subtly wrong way. I wouldn't say it does very much category theory either.
                                – darij grinberg
                                Dec 31 '12 at 21:51








                              • 5




                                I once heard from a rather well-known professor that he and another professor didn't quite get why a proof of a theorem was "obvious". It turned out that it wasn't so obvious, and they wrote an article about the proof. Quite fun. I think Lang has an absolutely fantastic idea of what topics to include, but the exposition is not ideal.
                                – Dedalus
                                Jun 7 '13 at 10:47















                              up vote
                              26
                              down vote



                              accepted










                              Lang's Algebra contains a lot of introductory material on categories, which is really nice since it's done with constant motivation from algebra (e.g. coproducts are introduced right before the free product of groups is discussed).






                              share|cite|improve this answer



















                              • 17




                                Lang's algebra also has significant typos that make it frustrating to read if you do not have enough mathematical maturity.
                                – user126
                                Jul 24 '10 at 11:07






                              • 27




                                re the typos: this is one instance where buying a used book that someone has marked up can be a really good idea.
                                – Isaac
                                Jul 24 '10 at 16:08






                              • 8




                                Bergman has a HUGE (ca 200 pages) companion to Lang's Algebra book math.berkeley.edu/~gbergman/.C.to.L . But even with this companion, I am not really sure if Lang is a good textbook to learn from. It does the right things, but it often does them in sloppy and/or subtly wrong way. I wouldn't say it does very much category theory either.
                                – darij grinberg
                                Dec 31 '12 at 21:51








                              • 5




                                I once heard from a rather well-known professor that he and another professor didn't quite get why a proof of a theorem was "obvious". It turned out that it wasn't so obvious, and they wrote an article about the proof. Quite fun. I think Lang has an absolutely fantastic idea of what topics to include, but the exposition is not ideal.
                                – Dedalus
                                Jun 7 '13 at 10:47













                              up vote
                              26
                              down vote



                              accepted







                              up vote
                              26
                              down vote



                              accepted






                              Lang's Algebra contains a lot of introductory material on categories, which is really nice since it's done with constant motivation from algebra (e.g. coproducts are introduced right before the free product of groups is discussed).






                              share|cite|improve this answer














                              Lang's Algebra contains a lot of introductory material on categories, which is really nice since it's done with constant motivation from algebra (e.g. coproducts are introduced right before the free product of groups is discussed).







                              share|cite|improve this answer














                              share|cite|improve this answer



                              share|cite|improve this answer








                              answered Jul 21 '10 at 20:18


























                              community wiki





                              Akhil Mathew









                              • 17




                                Lang's algebra also has significant typos that make it frustrating to read if you do not have enough mathematical maturity.
                                – user126
                                Jul 24 '10 at 11:07






                              • 27




                                re the typos: this is one instance where buying a used book that someone has marked up can be a really good idea.
                                – Isaac
                                Jul 24 '10 at 16:08






                              • 8




                                Bergman has a HUGE (ca 200 pages) companion to Lang's Algebra book math.berkeley.edu/~gbergman/.C.to.L . But even with this companion, I am not really sure if Lang is a good textbook to learn from. It does the right things, but it often does them in sloppy and/or subtly wrong way. I wouldn't say it does very much category theory either.
                                – darij grinberg
                                Dec 31 '12 at 21:51








                              • 5




                                I once heard from a rather well-known professor that he and another professor didn't quite get why a proof of a theorem was "obvious". It turned out that it wasn't so obvious, and they wrote an article about the proof. Quite fun. I think Lang has an absolutely fantastic idea of what topics to include, but the exposition is not ideal.
                                – Dedalus
                                Jun 7 '13 at 10:47














                              • 17




                                Lang's algebra also has significant typos that make it frustrating to read if you do not have enough mathematical maturity.
                                – user126
                                Jul 24 '10 at 11:07






                              • 27




                                re the typos: this is one instance where buying a used book that someone has marked up can be a really good idea.
                                – Isaac
                                Jul 24 '10 at 16:08






                              • 8




                                Bergman has a HUGE (ca 200 pages) companion to Lang's Algebra book math.berkeley.edu/~gbergman/.C.to.L . But even with this companion, I am not really sure if Lang is a good textbook to learn from. It does the right things, but it often does them in sloppy and/or subtly wrong way. I wouldn't say it does very much category theory either.
                                – darij grinberg
                                Dec 31 '12 at 21:51








                              • 5




                                I once heard from a rather well-known professor that he and another professor didn't quite get why a proof of a theorem was "obvious". It turned out that it wasn't so obvious, and they wrote an article about the proof. Quite fun. I think Lang has an absolutely fantastic idea of what topics to include, but the exposition is not ideal.
                                – Dedalus
                                Jun 7 '13 at 10:47








                              17




                              17




                              Lang's algebra also has significant typos that make it frustrating to read if you do not have enough mathematical maturity.
                              – user126
                              Jul 24 '10 at 11:07




                              Lang's algebra also has significant typos that make it frustrating to read if you do not have enough mathematical maturity.
                              – user126
                              Jul 24 '10 at 11:07




                              27




                              27




                              re the typos: this is one instance where buying a used book that someone has marked up can be a really good idea.
                              – Isaac
                              Jul 24 '10 at 16:08




                              re the typos: this is one instance where buying a used book that someone has marked up can be a really good idea.
                              – Isaac
                              Jul 24 '10 at 16:08




                              8




                              8




                              Bergman has a HUGE (ca 200 pages) companion to Lang's Algebra book math.berkeley.edu/~gbergman/.C.to.L . But even with this companion, I am not really sure if Lang is a good textbook to learn from. It does the right things, but it often does them in sloppy and/or subtly wrong way. I wouldn't say it does very much category theory either.
                              – darij grinberg
                              Dec 31 '12 at 21:51






                              Bergman has a HUGE (ca 200 pages) companion to Lang's Algebra book math.berkeley.edu/~gbergman/.C.to.L . But even with this companion, I am not really sure if Lang is a good textbook to learn from. It does the right things, but it often does them in sloppy and/or subtly wrong way. I wouldn't say it does very much category theory either.
                              – darij grinberg
                              Dec 31 '12 at 21:51






                              5




                              5




                              I once heard from a rather well-known professor that he and another professor didn't quite get why a proof of a theorem was "obvious". It turned out that it wasn't so obvious, and they wrote an article about the proof. Quite fun. I think Lang has an absolutely fantastic idea of what topics to include, but the exposition is not ideal.
                              – Dedalus
                              Jun 7 '13 at 10:47




                              I once heard from a rather well-known professor that he and another professor didn't quite get why a proof of a theorem was "obvious". It turned out that it wasn't so obvious, and they wrote an article about the proof. Quite fun. I think Lang has an absolutely fantastic idea of what topics to include, but the exposition is not ideal.
                              – Dedalus
                              Jun 7 '13 at 10:47










                              up vote
                              41
                              down vote













                              Categories for the Working mathematician by Mac Lane



                              Categories and Sheaves by Kashiwara and Schapira






                              share|cite|improve this answer



















                              • 17




                                pfft, only punks read Cat & Sheaves. These lecture notes by Schapira are better: people.math.jussieu.fr/~schapira/lectnotes/AlTo.pdf They use some nice specific examples and problems to develop category theory. With the added bonus of learning some nice alg top along with it. :D:D:D
                                – BBischof
                                Jul 21 '10 at 23:19






                              • 9




                                Uh-why do only "punks" read Cat & Sheaves? I happen to think it's a terrific and modern introduction to homological algebra and related fields.
                                – Mathemagician1234
                                Sep 13 '11 at 18:35






                              • 14




                                What do you mean by punks? What's wrong with the book. Your comment really made me not want to read the book (especially because it has 7 upvotes, although it doesn't explain anything.
                                – Jorge Fernández
                                Mar 10 '13 at 17:26






                              • 2




                                I like Schapira/Kashiwara. But probably not for an introduction
                                – Rachmaninoff
                                May 27 '16 at 13:17






                              • 3




                                fwiw, "pfft, only punks ..." sounds like the beginning of a joking remark to me.
                                – Soham Chowdhury
                                Jan 21 at 16:34















                              up vote
                              41
                              down vote













                              Categories for the Working mathematician by Mac Lane



                              Categories and Sheaves by Kashiwara and Schapira






                              share|cite|improve this answer



















                              • 17




                                pfft, only punks read Cat & Sheaves. These lecture notes by Schapira are better: people.math.jussieu.fr/~schapira/lectnotes/AlTo.pdf They use some nice specific examples and problems to develop category theory. With the added bonus of learning some nice alg top along with it. :D:D:D
                                – BBischof
                                Jul 21 '10 at 23:19






                              • 9




                                Uh-why do only "punks" read Cat & Sheaves? I happen to think it's a terrific and modern introduction to homological algebra and related fields.
                                – Mathemagician1234
                                Sep 13 '11 at 18:35






                              • 14




                                What do you mean by punks? What's wrong with the book. Your comment really made me not want to read the book (especially because it has 7 upvotes, although it doesn't explain anything.
                                – Jorge Fernández
                                Mar 10 '13 at 17:26






                              • 2




                                I like Schapira/Kashiwara. But probably not for an introduction
                                – Rachmaninoff
                                May 27 '16 at 13:17






                              • 3




                                fwiw, "pfft, only punks ..." sounds like the beginning of a joking remark to me.
                                – Soham Chowdhury
                                Jan 21 at 16:34













                              up vote
                              41
                              down vote










                              up vote
                              41
                              down vote









                              Categories for the Working mathematician by Mac Lane



                              Categories and Sheaves by Kashiwara and Schapira






                              share|cite|improve this answer














                              Categories for the Working mathematician by Mac Lane



                              Categories and Sheaves by Kashiwara and Schapira







                              share|cite|improve this answer














                              share|cite|improve this answer



                              share|cite|improve this answer








                              answered Jul 21 '10 at 19:35


























                              community wiki





                              user126









                              • 17




                                pfft, only punks read Cat & Sheaves. These lecture notes by Schapira are better: people.math.jussieu.fr/~schapira/lectnotes/AlTo.pdf They use some nice specific examples and problems to develop category theory. With the added bonus of learning some nice alg top along with it. :D:D:D
                                – BBischof
                                Jul 21 '10 at 23:19






                              • 9




                                Uh-why do only "punks" read Cat & Sheaves? I happen to think it's a terrific and modern introduction to homological algebra and related fields.
                                – Mathemagician1234
                                Sep 13 '11 at 18:35






                              • 14




                                What do you mean by punks? What's wrong with the book. Your comment really made me not want to read the book (especially because it has 7 upvotes, although it doesn't explain anything.
                                – Jorge Fernández
                                Mar 10 '13 at 17:26






                              • 2




                                I like Schapira/Kashiwara. But probably not for an introduction
                                – Rachmaninoff
                                May 27 '16 at 13:17






                              • 3




                                fwiw, "pfft, only punks ..." sounds like the beginning of a joking remark to me.
                                – Soham Chowdhury
                                Jan 21 at 16:34














                              • 17




                                pfft, only punks read Cat & Sheaves. These lecture notes by Schapira are better: people.math.jussieu.fr/~schapira/lectnotes/AlTo.pdf They use some nice specific examples and problems to develop category theory. With the added bonus of learning some nice alg top along with it. :D:D:D
                                – BBischof
                                Jul 21 '10 at 23:19






                              • 9




                                Uh-why do only "punks" read Cat & Sheaves? I happen to think it's a terrific and modern introduction to homological algebra and related fields.
                                – Mathemagician1234
                                Sep 13 '11 at 18:35






                              • 14




                                What do you mean by punks? What's wrong with the book. Your comment really made me not want to read the book (especially because it has 7 upvotes, although it doesn't explain anything.
                                – Jorge Fernández
                                Mar 10 '13 at 17:26






                              • 2




                                I like Schapira/Kashiwara. But probably not for an introduction
                                – Rachmaninoff
                                May 27 '16 at 13:17






                              • 3




                                fwiw, "pfft, only punks ..." sounds like the beginning of a joking remark to me.
                                – Soham Chowdhury
                                Jan 21 at 16:34








                              17




                              17




                              pfft, only punks read Cat & Sheaves. These lecture notes by Schapira are better: people.math.jussieu.fr/~schapira/lectnotes/AlTo.pdf They use some nice specific examples and problems to develop category theory. With the added bonus of learning some nice alg top along with it. :D:D:D
                              – BBischof
                              Jul 21 '10 at 23:19




                              pfft, only punks read Cat & Sheaves. These lecture notes by Schapira are better: people.math.jussieu.fr/~schapira/lectnotes/AlTo.pdf They use some nice specific examples and problems to develop category theory. With the added bonus of learning some nice alg top along with it. :D:D:D
                              – BBischof
                              Jul 21 '10 at 23:19




                              9




                              9




                              Uh-why do only "punks" read Cat & Sheaves? I happen to think it's a terrific and modern introduction to homological algebra and related fields.
                              – Mathemagician1234
                              Sep 13 '11 at 18:35




                              Uh-why do only "punks" read Cat & Sheaves? I happen to think it's a terrific and modern introduction to homological algebra and related fields.
                              – Mathemagician1234
                              Sep 13 '11 at 18:35




                              14




                              14




                              What do you mean by punks? What's wrong with the book. Your comment really made me not want to read the book (especially because it has 7 upvotes, although it doesn't explain anything.
                              – Jorge Fernández
                              Mar 10 '13 at 17:26




                              What do you mean by punks? What's wrong with the book. Your comment really made me not want to read the book (especially because it has 7 upvotes, although it doesn't explain anything.
                              – Jorge Fernández
                              Mar 10 '13 at 17:26




                              2




                              2




                              I like Schapira/Kashiwara. But probably not for an introduction
                              – Rachmaninoff
                              May 27 '16 at 13:17




                              I like Schapira/Kashiwara. But probably not for an introduction
                              – Rachmaninoff
                              May 27 '16 at 13:17




                              3




                              3




                              fwiw, "pfft, only punks ..." sounds like the beginning of a joking remark to me.
                              – Soham Chowdhury
                              Jan 21 at 16:34




                              fwiw, "pfft, only punks ..." sounds like the beginning of a joking remark to me.
                              – Soham Chowdhury
                              Jan 21 at 16:34










                              up vote
                              33
                              down vote













                              And when you get bored of reading, let the Catsters take over. (78 videos on Category theory!)






                              share|cite|improve this answer



























                                up vote
                                33
                                down vote













                                And when you get bored of reading, let the Catsters take over. (78 videos on Category theory!)






                                share|cite|improve this answer

























                                  up vote
                                  33
                                  down vote










                                  up vote
                                  33
                                  down vote









                                  And when you get bored of reading, let the Catsters take over. (78 videos on Category theory!)






                                  share|cite|improve this answer














                                  And when you get bored of reading, let the Catsters take over. (78 videos on Category theory!)







                                  share|cite|improve this answer














                                  share|cite|improve this answer



                                  share|cite|improve this answer








                                  answered Jul 29 '10 at 8:02


























                                  community wiki





                                  Dylan Wilson























                                      up vote
                                      32
                                      down vote













                                      Another book that is more elementary, not requiring any algebraic topology for motivation, and formulating the basics through a question and answer approach is:



                                      Conceptual Mathematics



                                      An added benefit is that it is written by an expert!






                                      share|cite|improve this answer



















                                      • 5




                                        Could someone edit this to give the link a name, so people immediately know what is being linked to? It's Lawvere and Schanuel's Conceptual Mathematics. Which is a really wonderful book for learning some category theory if you don't have the background to understand the heavy duty algebraic topology etc examples that enter into some discussions of CT at a very early stage.
                                        – Seamus
                                        Aug 3 '10 at 13:07






                                      • 1




                                        @Seamus Ok done!
                                        – BBischof
                                        Aug 3 '10 at 15:06










                                      • Are you implying that usually books are not written by experts? :-?
                                        – Andrea Ferretti
                                        Aug 22 '10 at 13:24






                                      • 2




                                        @Andrea hehe no, but Lawvere is particularly great!
                                        – BBischof
                                        Aug 22 '10 at 18:37






                                      • 8




                                        One particular prolific author was rumoured to write (and publish) many of his books in order for him to learn their subjects :-)
                                        – Robin Chapman
                                        Aug 23 '10 at 18:35















                                      up vote
                                      32
                                      down vote













                                      Another book that is more elementary, not requiring any algebraic topology for motivation, and formulating the basics through a question and answer approach is:



                                      Conceptual Mathematics



                                      An added benefit is that it is written by an expert!






                                      share|cite|improve this answer



















                                      • 5




                                        Could someone edit this to give the link a name, so people immediately know what is being linked to? It's Lawvere and Schanuel's Conceptual Mathematics. Which is a really wonderful book for learning some category theory if you don't have the background to understand the heavy duty algebraic topology etc examples that enter into some discussions of CT at a very early stage.
                                        – Seamus
                                        Aug 3 '10 at 13:07






                                      • 1




                                        @Seamus Ok done!
                                        – BBischof
                                        Aug 3 '10 at 15:06










                                      • Are you implying that usually books are not written by experts? :-?
                                        – Andrea Ferretti
                                        Aug 22 '10 at 13:24






                                      • 2




                                        @Andrea hehe no, but Lawvere is particularly great!
                                        – BBischof
                                        Aug 22 '10 at 18:37






                                      • 8




                                        One particular prolific author was rumoured to write (and publish) many of his books in order for him to learn their subjects :-)
                                        – Robin Chapman
                                        Aug 23 '10 at 18:35













                                      up vote
                                      32
                                      down vote










                                      up vote
                                      32
                                      down vote









                                      Another book that is more elementary, not requiring any algebraic topology for motivation, and formulating the basics through a question and answer approach is:



                                      Conceptual Mathematics



                                      An added benefit is that it is written by an expert!






                                      share|cite|improve this answer














                                      Another book that is more elementary, not requiring any algebraic topology for motivation, and formulating the basics through a question and answer approach is:



                                      Conceptual Mathematics



                                      An added benefit is that it is written by an expert!







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      edited Aug 3 '10 at 15:06


























                                      community wiki





                                      2 revs
                                      BBischof









                                      • 5




                                        Could someone edit this to give the link a name, so people immediately know what is being linked to? It's Lawvere and Schanuel's Conceptual Mathematics. Which is a really wonderful book for learning some category theory if you don't have the background to understand the heavy duty algebraic topology etc examples that enter into some discussions of CT at a very early stage.
                                        – Seamus
                                        Aug 3 '10 at 13:07






                                      • 1




                                        @Seamus Ok done!
                                        – BBischof
                                        Aug 3 '10 at 15:06










                                      • Are you implying that usually books are not written by experts? :-?
                                        – Andrea Ferretti
                                        Aug 22 '10 at 13:24






                                      • 2




                                        @Andrea hehe no, but Lawvere is particularly great!
                                        – BBischof
                                        Aug 22 '10 at 18:37






                                      • 8




                                        One particular prolific author was rumoured to write (and publish) many of his books in order for him to learn their subjects :-)
                                        – Robin Chapman
                                        Aug 23 '10 at 18:35














                                      • 5




                                        Could someone edit this to give the link a name, so people immediately know what is being linked to? It's Lawvere and Schanuel's Conceptual Mathematics. Which is a really wonderful book for learning some category theory if you don't have the background to understand the heavy duty algebraic topology etc examples that enter into some discussions of CT at a very early stage.
                                        – Seamus
                                        Aug 3 '10 at 13:07






                                      • 1




                                        @Seamus Ok done!
                                        – BBischof
                                        Aug 3 '10 at 15:06










                                      • Are you implying that usually books are not written by experts? :-?
                                        – Andrea Ferretti
                                        Aug 22 '10 at 13:24






                                      • 2




                                        @Andrea hehe no, but Lawvere is particularly great!
                                        – BBischof
                                        Aug 22 '10 at 18:37






                                      • 8




                                        One particular prolific author was rumoured to write (and publish) many of his books in order for him to learn their subjects :-)
                                        – Robin Chapman
                                        Aug 23 '10 at 18:35








                                      5




                                      5




                                      Could someone edit this to give the link a name, so people immediately know what is being linked to? It's Lawvere and Schanuel's Conceptual Mathematics. Which is a really wonderful book for learning some category theory if you don't have the background to understand the heavy duty algebraic topology etc examples that enter into some discussions of CT at a very early stage.
                                      – Seamus
                                      Aug 3 '10 at 13:07




                                      Could someone edit this to give the link a name, so people immediately know what is being linked to? It's Lawvere and Schanuel's Conceptual Mathematics. Which is a really wonderful book for learning some category theory if you don't have the background to understand the heavy duty algebraic topology etc examples that enter into some discussions of CT at a very early stage.
                                      – Seamus
                                      Aug 3 '10 at 13:07




                                      1




                                      1




                                      @Seamus Ok done!
                                      – BBischof
                                      Aug 3 '10 at 15:06




                                      @Seamus Ok done!
                                      – BBischof
                                      Aug 3 '10 at 15:06












                                      Are you implying that usually books are not written by experts? :-?
                                      – Andrea Ferretti
                                      Aug 22 '10 at 13:24




                                      Are you implying that usually books are not written by experts? :-?
                                      – Andrea Ferretti
                                      Aug 22 '10 at 13:24




                                      2




                                      2




                                      @Andrea hehe no, but Lawvere is particularly great!
                                      – BBischof
                                      Aug 22 '10 at 18:37




                                      @Andrea hehe no, but Lawvere is particularly great!
                                      – BBischof
                                      Aug 22 '10 at 18:37




                                      8




                                      8




                                      One particular prolific author was rumoured to write (and publish) many of his books in order for him to learn their subjects :-)
                                      – Robin Chapman
                                      Aug 23 '10 at 18:35




                                      One particular prolific author was rumoured to write (and publish) many of his books in order for him to learn their subjects :-)
                                      – Robin Chapman
                                      Aug 23 '10 at 18:35










                                      up vote
                                      21
                                      down vote













                                      Awodey's new book, while pricey, is a really pleasant read and a good tour of Category Theory from a logician's perspective all the way up to topos theory, with a more up to date view on categories than Mac Lane.






                                      share|cite|improve this answer



















                                      • 7




                                        Peter Smith has criticised Awodey's book for being pitched too high to be an introduction to categories logicmatters.net/2008/06/awodeys-category-theory-ch-1
                                        – Seamus
                                        Aug 5 '10 at 10:37






                                      • 1




                                        I will admit to having mainly used Awodey as source material while putting together my own introduction to categories lecture course material. As such, it was highly pleasant - but I am not a good example of what a newcomer'll need... haskell.org/haskellwiki/User:Michiexile/MATH198
                                        – Mikael Vejdemo-Johansson
                                        Aug 5 '10 at 11:44






                                      • 1




                                        +1 for Awodey,which is the only book I would consider to teach category theory to undergraduates.
                                        – Mathemagician1234
                                        Sep 13 '11 at 18:39










                                      • I wanted to add that his book is now available in paperback at half the price of the hardcover edition: Amazon
                                        – user4536
                                        May 30 '12 at 18:06















                                      up vote
                                      21
                                      down vote













                                      Awodey's new book, while pricey, is a really pleasant read and a good tour of Category Theory from a logician's perspective all the way up to topos theory, with a more up to date view on categories than Mac Lane.






                                      share|cite|improve this answer



















                                      • 7




                                        Peter Smith has criticised Awodey's book for being pitched too high to be an introduction to categories logicmatters.net/2008/06/awodeys-category-theory-ch-1
                                        – Seamus
                                        Aug 5 '10 at 10:37






                                      • 1




                                        I will admit to having mainly used Awodey as source material while putting together my own introduction to categories lecture course material. As such, it was highly pleasant - but I am not a good example of what a newcomer'll need... haskell.org/haskellwiki/User:Michiexile/MATH198
                                        – Mikael Vejdemo-Johansson
                                        Aug 5 '10 at 11:44






                                      • 1




                                        +1 for Awodey,which is the only book I would consider to teach category theory to undergraduates.
                                        – Mathemagician1234
                                        Sep 13 '11 at 18:39










                                      • I wanted to add that his book is now available in paperback at half the price of the hardcover edition: Amazon
                                        – user4536
                                        May 30 '12 at 18:06













                                      up vote
                                      21
                                      down vote










                                      up vote
                                      21
                                      down vote









                                      Awodey's new book, while pricey, is a really pleasant read and a good tour of Category Theory from a logician's perspective all the way up to topos theory, with a more up to date view on categories than Mac Lane.






                                      share|cite|improve this answer














                                      Awodey's new book, while pricey, is a really pleasant read and a good tour of Category Theory from a logician's perspective all the way up to topos theory, with a more up to date view on categories than Mac Lane.







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      answered Aug 4 '10 at 8:23


























                                      community wiki





                                      Mikael Vejdemo-Johansson









                                      • 7




                                        Peter Smith has criticised Awodey's book for being pitched too high to be an introduction to categories logicmatters.net/2008/06/awodeys-category-theory-ch-1
                                        – Seamus
                                        Aug 5 '10 at 10:37






                                      • 1




                                        I will admit to having mainly used Awodey as source material while putting together my own introduction to categories lecture course material. As such, it was highly pleasant - but I am not a good example of what a newcomer'll need... haskell.org/haskellwiki/User:Michiexile/MATH198
                                        – Mikael Vejdemo-Johansson
                                        Aug 5 '10 at 11:44






                                      • 1




                                        +1 for Awodey,which is the only book I would consider to teach category theory to undergraduates.
                                        – Mathemagician1234
                                        Sep 13 '11 at 18:39










                                      • I wanted to add that his book is now available in paperback at half the price of the hardcover edition: Amazon
                                        – user4536
                                        May 30 '12 at 18:06














                                      • 7




                                        Peter Smith has criticised Awodey's book for being pitched too high to be an introduction to categories logicmatters.net/2008/06/awodeys-category-theory-ch-1
                                        – Seamus
                                        Aug 5 '10 at 10:37






                                      • 1




                                        I will admit to having mainly used Awodey as source material while putting together my own introduction to categories lecture course material. As such, it was highly pleasant - but I am not a good example of what a newcomer'll need... haskell.org/haskellwiki/User:Michiexile/MATH198
                                        – Mikael Vejdemo-Johansson
                                        Aug 5 '10 at 11:44






                                      • 1




                                        +1 for Awodey,which is the only book I would consider to teach category theory to undergraduates.
                                        – Mathemagician1234
                                        Sep 13 '11 at 18:39










                                      • I wanted to add that his book is now available in paperback at half the price of the hardcover edition: Amazon
                                        – user4536
                                        May 30 '12 at 18:06








                                      7




                                      7




                                      Peter Smith has criticised Awodey's book for being pitched too high to be an introduction to categories logicmatters.net/2008/06/awodeys-category-theory-ch-1
                                      – Seamus
                                      Aug 5 '10 at 10:37




                                      Peter Smith has criticised Awodey's book for being pitched too high to be an introduction to categories logicmatters.net/2008/06/awodeys-category-theory-ch-1
                                      – Seamus
                                      Aug 5 '10 at 10:37




                                      1




                                      1




                                      I will admit to having mainly used Awodey as source material while putting together my own introduction to categories lecture course material. As such, it was highly pleasant - but I am not a good example of what a newcomer'll need... haskell.org/haskellwiki/User:Michiexile/MATH198
                                      – Mikael Vejdemo-Johansson
                                      Aug 5 '10 at 11:44




                                      I will admit to having mainly used Awodey as source material while putting together my own introduction to categories lecture course material. As such, it was highly pleasant - but I am not a good example of what a newcomer'll need... haskell.org/haskellwiki/User:Michiexile/MATH198
                                      – Mikael Vejdemo-Johansson
                                      Aug 5 '10 at 11:44




                                      1




                                      1




                                      +1 for Awodey,which is the only book I would consider to teach category theory to undergraduates.
                                      – Mathemagician1234
                                      Sep 13 '11 at 18:39




                                      +1 for Awodey,which is the only book I would consider to teach category theory to undergraduates.
                                      – Mathemagician1234
                                      Sep 13 '11 at 18:39












                                      I wanted to add that his book is now available in paperback at half the price of the hardcover edition: Amazon
                                      – user4536
                                      May 30 '12 at 18:06




                                      I wanted to add that his book is now available in paperback at half the price of the hardcover edition: Amazon
                                      – user4536
                                      May 30 '12 at 18:06










                                      up vote
                                      20
                                      down vote













                                      I'm also a fan of Tom Leinster's lecture notes, available on his webpage here. In difficulty level, I would say these are harder than Conceptual Mathematics but easier than Categories and Sheaves, and at a similar level as Categories for the Working Mathematician.






                                      share|cite|improve this answer



















                                      • 1




                                        I discovered those notes recently and in my opinion they are great!
                                        – Pandora
                                        Dec 6 '11 at 21:32






                                      • 1




                                        He also has a book coming out: Basic Category Theory.
                                        – J W
                                        Jul 21 '14 at 19:45






                                      • 3




                                        @JW: It's published. See maths.ed.ac.uk/~tl/bct. And it will be available free (online) in January, 2016.
                                        – eltonjohn
                                        Aug 9 '14 at 1:46












                                      • @eltonjohn: Thank you; that's useful to know. I note that it's in arrangement with the publisher and that the book will be both freely downloadable and freely editable.
                                        – J W
                                        Aug 9 '14 at 1:58















                                      up vote
                                      20
                                      down vote













                                      I'm also a fan of Tom Leinster's lecture notes, available on his webpage here. In difficulty level, I would say these are harder than Conceptual Mathematics but easier than Categories and Sheaves, and at a similar level as Categories for the Working Mathematician.






                                      share|cite|improve this answer



















                                      • 1




                                        I discovered those notes recently and in my opinion they are great!
                                        – Pandora
                                        Dec 6 '11 at 21:32






                                      • 1




                                        He also has a book coming out: Basic Category Theory.
                                        – J W
                                        Jul 21 '14 at 19:45






                                      • 3




                                        @JW: It's published. See maths.ed.ac.uk/~tl/bct. And it will be available free (online) in January, 2016.
                                        – eltonjohn
                                        Aug 9 '14 at 1:46












                                      • @eltonjohn: Thank you; that's useful to know. I note that it's in arrangement with the publisher and that the book will be both freely downloadable and freely editable.
                                        – J W
                                        Aug 9 '14 at 1:58













                                      up vote
                                      20
                                      down vote










                                      up vote
                                      20
                                      down vote









                                      I'm also a fan of Tom Leinster's lecture notes, available on his webpage here. In difficulty level, I would say these are harder than Conceptual Mathematics but easier than Categories and Sheaves, and at a similar level as Categories for the Working Mathematician.






                                      share|cite|improve this answer














                                      I'm also a fan of Tom Leinster's lecture notes, available on his webpage here. In difficulty level, I would say these are harder than Conceptual Mathematics but easier than Categories and Sheaves, and at a similar level as Categories for the Working Mathematician.







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      edited Sep 27 '13 at 18:48


























                                      community wiki





                                      2 revs, 2 users 86%
                                      Patrick Schultz










                                      • 1




                                        I discovered those notes recently and in my opinion they are great!
                                        – Pandora
                                        Dec 6 '11 at 21:32






                                      • 1




                                        He also has a book coming out: Basic Category Theory.
                                        – J W
                                        Jul 21 '14 at 19:45






                                      • 3




                                        @JW: It's published. See maths.ed.ac.uk/~tl/bct. And it will be available free (online) in January, 2016.
                                        – eltonjohn
                                        Aug 9 '14 at 1:46












                                      • @eltonjohn: Thank you; that's useful to know. I note that it's in arrangement with the publisher and that the book will be both freely downloadable and freely editable.
                                        – J W
                                        Aug 9 '14 at 1:58














                                      • 1




                                        I discovered those notes recently and in my opinion they are great!
                                        – Pandora
                                        Dec 6 '11 at 21:32






                                      • 1




                                        He also has a book coming out: Basic Category Theory.
                                        – J W
                                        Jul 21 '14 at 19:45






                                      • 3




                                        @JW: It's published. See maths.ed.ac.uk/~tl/bct. And it will be available free (online) in January, 2016.
                                        – eltonjohn
                                        Aug 9 '14 at 1:46












                                      • @eltonjohn: Thank you; that's useful to know. I note that it's in arrangement with the publisher and that the book will be both freely downloadable and freely editable.
                                        – J W
                                        Aug 9 '14 at 1:58








                                      1




                                      1




                                      I discovered those notes recently and in my opinion they are great!
                                      – Pandora
                                      Dec 6 '11 at 21:32




                                      I discovered those notes recently and in my opinion they are great!
                                      – Pandora
                                      Dec 6 '11 at 21:32




                                      1




                                      1




                                      He also has a book coming out: Basic Category Theory.
                                      – J W
                                      Jul 21 '14 at 19:45




                                      He also has a book coming out: Basic Category Theory.
                                      – J W
                                      Jul 21 '14 at 19:45




                                      3




                                      3




                                      @JW: It's published. See maths.ed.ac.uk/~tl/bct. And it will be available free (online) in January, 2016.
                                      – eltonjohn
                                      Aug 9 '14 at 1:46






                                      @JW: It's published. See maths.ed.ac.uk/~tl/bct. And it will be available free (online) in January, 2016.
                                      – eltonjohn
                                      Aug 9 '14 at 1:46














                                      @eltonjohn: Thank you; that's useful to know. I note that it's in arrangement with the publisher and that the book will be both freely downloadable and freely editable.
                                      – J W
                                      Aug 9 '14 at 1:58




                                      @eltonjohn: Thank you; that's useful to know. I note that it's in arrangement with the publisher and that the book will be both freely downloadable and freely editable.
                                      – J W
                                      Aug 9 '14 at 1:58










                                      up vote
                                      18
                                      down vote













                                      The nLab is a great resource for category theory.






                                      share|cite|improve this answer



















                                      • 21




                                        I take the OP to be asking about introdutions to category theory. nLab is not a good introductory text...
                                        – Seamus
                                        Aug 4 '10 at 7:30






                                      • 3




                                        @Seamus You're right. But it's a good general reference, in the same way that wikipedia is a good general reference but shouldn't be used as a text.
                                        – Kevin H. Lin
                                        May 4 '13 at 16:03















                                      up vote
                                      18
                                      down vote













                                      The nLab is a great resource for category theory.






                                      share|cite|improve this answer



















                                      • 21




                                        I take the OP to be asking about introdutions to category theory. nLab is not a good introductory text...
                                        – Seamus
                                        Aug 4 '10 at 7:30






                                      • 3




                                        @Seamus You're right. But it's a good general reference, in the same way that wikipedia is a good general reference but shouldn't be used as a text.
                                        – Kevin H. Lin
                                        May 4 '13 at 16:03













                                      up vote
                                      18
                                      down vote










                                      up vote
                                      18
                                      down vote









                                      The nLab is a great resource for category theory.






                                      share|cite|improve this answer














                                      The nLab is a great resource for category theory.







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      answered Jul 28 '10 at 21:23


























                                      community wiki





                                      Kevin H. Lin









                                      • 21




                                        I take the OP to be asking about introdutions to category theory. nLab is not a good introductory text...
                                        – Seamus
                                        Aug 4 '10 at 7:30






                                      • 3




                                        @Seamus You're right. But it's a good general reference, in the same way that wikipedia is a good general reference but shouldn't be used as a text.
                                        – Kevin H. Lin
                                        May 4 '13 at 16:03














                                      • 21




                                        I take the OP to be asking about introdutions to category theory. nLab is not a good introductory text...
                                        – Seamus
                                        Aug 4 '10 at 7:30






                                      • 3




                                        @Seamus You're right. But it's a good general reference, in the same way that wikipedia is a good general reference but shouldn't be used as a text.
                                        – Kevin H. Lin
                                        May 4 '13 at 16:03








                                      21




                                      21




                                      I take the OP to be asking about introdutions to category theory. nLab is not a good introductory text...
                                      – Seamus
                                      Aug 4 '10 at 7:30




                                      I take the OP to be asking about introdutions to category theory. nLab is not a good introductory text...
                                      – Seamus
                                      Aug 4 '10 at 7:30




                                      3




                                      3




                                      @Seamus You're right. But it's a good general reference, in the same way that wikipedia is a good general reference but shouldn't be used as a text.
                                      – Kevin H. Lin
                                      May 4 '13 at 16:03




                                      @Seamus You're right. But it's a good general reference, in the same way that wikipedia is a good general reference but shouldn't be used as a text.
                                      – Kevin H. Lin
                                      May 4 '13 at 16:03










                                      up vote
                                      15
                                      down vote













                                      The first few chapters of Goldblatt's Topoi: the categorial analysis of logic provide another fairly elementary introduction to the basics of category theory.






                                      share|cite|improve this answer



















                                      • 3




                                        Goldblatt's book (which is very beautifully written, by the way) is available online in its entirety here.
                                        – Hans Lundmark
                                        Aug 23 '10 at 6:51








                                      • 1




                                        I struggled for years to understand category theory until I met Goldblatt's book; then the struggle was over.
                                        – MJD
                                        Mar 11 '14 at 0:23















                                      up vote
                                      15
                                      down vote













                                      The first few chapters of Goldblatt's Topoi: the categorial analysis of logic provide another fairly elementary introduction to the basics of category theory.






                                      share|cite|improve this answer



















                                      • 3




                                        Goldblatt's book (which is very beautifully written, by the way) is available online in its entirety here.
                                        – Hans Lundmark
                                        Aug 23 '10 at 6:51








                                      • 1




                                        I struggled for years to understand category theory until I met Goldblatt's book; then the struggle was over.
                                        – MJD
                                        Mar 11 '14 at 0:23













                                      up vote
                                      15
                                      down vote










                                      up vote
                                      15
                                      down vote









                                      The first few chapters of Goldblatt's Topoi: the categorial analysis of logic provide another fairly elementary introduction to the basics of category theory.






                                      share|cite|improve this answer














                                      The first few chapters of Goldblatt's Topoi: the categorial analysis of logic provide another fairly elementary introduction to the basics of category theory.







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      edited Jun 7 '13 at 10:34


























                                      community wiki





                                      2 revs, 2 users 86%
                                      mathphysicist










                                      • 3




                                        Goldblatt's book (which is very beautifully written, by the way) is available online in its entirety here.
                                        – Hans Lundmark
                                        Aug 23 '10 at 6:51








                                      • 1




                                        I struggled for years to understand category theory until I met Goldblatt's book; then the struggle was over.
                                        – MJD
                                        Mar 11 '14 at 0:23














                                      • 3




                                        Goldblatt's book (which is very beautifully written, by the way) is available online in its entirety here.
                                        – Hans Lundmark
                                        Aug 23 '10 at 6:51








                                      • 1




                                        I struggled for years to understand category theory until I met Goldblatt's book; then the struggle was over.
                                        – MJD
                                        Mar 11 '14 at 0:23








                                      3




                                      3




                                      Goldblatt's book (which is very beautifully written, by the way) is available online in its entirety here.
                                      – Hans Lundmark
                                      Aug 23 '10 at 6:51






                                      Goldblatt's book (which is very beautifully written, by the way) is available online in its entirety here.
                                      – Hans Lundmark
                                      Aug 23 '10 at 6:51






                                      1




                                      1




                                      I struggled for years to understand category theory until I met Goldblatt's book; then the struggle was over.
                                      – MJD
                                      Mar 11 '14 at 0:23




                                      I struggled for years to understand category theory until I met Goldblatt's book; then the struggle was over.
                                      – MJD
                                      Mar 11 '14 at 0:23










                                      up vote
                                      14
                                      down vote













                                      Paolo Aluffi, Algebra: Chapter 0 has category theory woven all through it, particularly in Chapter IX of course. I can tell that randomly sampled pieces of the text are well-written, although I have never systematically read longer parts of it.






                                      share|cite|improve this answer



















                                      • 2




                                        I have gone through this book very carefully. It is indeed an excellent algebra book, but the last chapter is not very good.
                                        – Hui Yu
                                        Apr 30 '13 at 6:49

















                                      up vote
                                      14
                                      down vote













                                      Paolo Aluffi, Algebra: Chapter 0 has category theory woven all through it, particularly in Chapter IX of course. I can tell that randomly sampled pieces of the text are well-written, although I have never systematically read longer parts of it.






                                      share|cite|improve this answer



















                                      • 2




                                        I have gone through this book very carefully. It is indeed an excellent algebra book, but the last chapter is not very good.
                                        – Hui Yu
                                        Apr 30 '13 at 6:49















                                      up vote
                                      14
                                      down vote










                                      up vote
                                      14
                                      down vote









                                      Paolo Aluffi, Algebra: Chapter 0 has category theory woven all through it, particularly in Chapter IX of course. I can tell that randomly sampled pieces of the text are well-written, although I have never systematically read longer parts of it.






                                      share|cite|improve this answer














                                      Paolo Aluffi, Algebra: Chapter 0 has category theory woven all through it, particularly in Chapter IX of course. I can tell that randomly sampled pieces of the text are well-written, although I have never systematically read longer parts of it.







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      edited Dec 11 '14 at 17:46


























                                      community wiki





                                      2 revs, 2 users 86%
                                      darij grinberg









                                      • 2




                                        I have gone through this book very carefully. It is indeed an excellent algebra book, but the last chapter is not very good.
                                        – Hui Yu
                                        Apr 30 '13 at 6:49
















                                      • 2




                                        I have gone through this book very carefully. It is indeed an excellent algebra book, but the last chapter is not very good.
                                        – Hui Yu
                                        Apr 30 '13 at 6:49










                                      2




                                      2




                                      I have gone through this book very carefully. It is indeed an excellent algebra book, but the last chapter is not very good.
                                      – Hui Yu
                                      Apr 30 '13 at 6:49






                                      I have gone through this book very carefully. It is indeed an excellent algebra book, but the last chapter is not very good.
                                      – Hui Yu
                                      Apr 30 '13 at 6:49












                                      up vote
                                      13
                                      down vote













                                      As a young student, I enjoyed Peter Freyd's fun little book on abelian categories (available online as a TAC Reprint). The nice thing about Freyd's book is it isn't boring, and it has little pieces of wisdom (opinion) such as the remark that categories are not really important, you just define them so you can define functors. And in fact you just define functors so you can define natural transformations, the really interesting things.



                                      Of course you may disagree, but blunt debatable assertions (like this one) always make for more interesting reading. Another provocative remark by this author is the observation that he himself seldom learnt math by reading books, but rather by talking to people.



                                      From the nice link above I learned that Goldblatt also quotes a remark (which may have inspired Freyd's) by Eilenberg and Maclane that categories are entirely secondary to functors and natural transformations, on page 194 where he introduces these latter concepts.



                                      Leinster's notes linked by Patrick, look nice - a bit like an introduction to Maclane's Categories for the working mathematician, chatty and full of debatable assertions, (many of which I disagree with, but enjoy thinking about). He does not give much credit, but I believe the adjoint functor theorems he quotes without proof, (GAFT,...) may be due to Freyd. Leinster's notes are easy reading and informative.






                                      share|cite|improve this answer



















                                      • 2




                                        Eilenberg and Mac Lane's original paper: General theory of natural equivalences says that they defined "category" to define "functor", and "functor" to define "natural transformation". But I get the impression that the category theorists of today don't take that remark all that seriously.
                                        – Uday Reddy
                                        Dec 7 '13 at 18:44















                                      up vote
                                      13
                                      down vote













                                      As a young student, I enjoyed Peter Freyd's fun little book on abelian categories (available online as a TAC Reprint). The nice thing about Freyd's book is it isn't boring, and it has little pieces of wisdom (opinion) such as the remark that categories are not really important, you just define them so you can define functors. And in fact you just define functors so you can define natural transformations, the really interesting things.



                                      Of course you may disagree, but blunt debatable assertions (like this one) always make for more interesting reading. Another provocative remark by this author is the observation that he himself seldom learnt math by reading books, but rather by talking to people.



                                      From the nice link above I learned that Goldblatt also quotes a remark (which may have inspired Freyd's) by Eilenberg and Maclane that categories are entirely secondary to functors and natural transformations, on page 194 where he introduces these latter concepts.



                                      Leinster's notes linked by Patrick, look nice - a bit like an introduction to Maclane's Categories for the working mathematician, chatty and full of debatable assertions, (many of which I disagree with, but enjoy thinking about). He does not give much credit, but I believe the adjoint functor theorems he quotes without proof, (GAFT,...) may be due to Freyd. Leinster's notes are easy reading and informative.






                                      share|cite|improve this answer



















                                      • 2




                                        Eilenberg and Mac Lane's original paper: General theory of natural equivalences says that they defined "category" to define "functor", and "functor" to define "natural transformation". But I get the impression that the category theorists of today don't take that remark all that seriously.
                                        – Uday Reddy
                                        Dec 7 '13 at 18:44













                                      up vote
                                      13
                                      down vote










                                      up vote
                                      13
                                      down vote









                                      As a young student, I enjoyed Peter Freyd's fun little book on abelian categories (available online as a TAC Reprint). The nice thing about Freyd's book is it isn't boring, and it has little pieces of wisdom (opinion) such as the remark that categories are not really important, you just define them so you can define functors. And in fact you just define functors so you can define natural transformations, the really interesting things.



                                      Of course you may disagree, but blunt debatable assertions (like this one) always make for more interesting reading. Another provocative remark by this author is the observation that he himself seldom learnt math by reading books, but rather by talking to people.



                                      From the nice link above I learned that Goldblatt also quotes a remark (which may have inspired Freyd's) by Eilenberg and Maclane that categories are entirely secondary to functors and natural transformations, on page 194 where he introduces these latter concepts.



                                      Leinster's notes linked by Patrick, look nice - a bit like an introduction to Maclane's Categories for the working mathematician, chatty and full of debatable assertions, (many of which I disagree with, but enjoy thinking about). He does not give much credit, but I believe the adjoint functor theorems he quotes without proof, (GAFT,...) may be due to Freyd. Leinster's notes are easy reading and informative.






                                      share|cite|improve this answer














                                      As a young student, I enjoyed Peter Freyd's fun little book on abelian categories (available online as a TAC Reprint). The nice thing about Freyd's book is it isn't boring, and it has little pieces of wisdom (opinion) such as the remark that categories are not really important, you just define them so you can define functors. And in fact you just define functors so you can define natural transformations, the really interesting things.



                                      Of course you may disagree, but blunt debatable assertions (like this one) always make for more interesting reading. Another provocative remark by this author is the observation that he himself seldom learnt math by reading books, but rather by talking to people.



                                      From the nice link above I learned that Goldblatt also quotes a remark (which may have inspired Freyd's) by Eilenberg and Maclane that categories are entirely secondary to functors and natural transformations, on page 194 where he introduces these latter concepts.



                                      Leinster's notes linked by Patrick, look nice - a bit like an introduction to Maclane's Categories for the working mathematician, chatty and full of debatable assertions, (many of which I disagree with, but enjoy thinking about). He does not give much credit, but I believe the adjoint functor theorems he quotes without proof, (GAFT,...) may be due to Freyd. Leinster's notes are easy reading and informative.







                                      share|cite|improve this answer














                                      share|cite|improve this answer



                                      share|cite|improve this answer








                                      edited Nov 15 '17 at 9:53


























                                      community wiki





                                      5 revs, 2 users 71%
                                      roy smith









                                      • 2




                                        Eilenberg and Mac Lane's original paper: General theory of natural equivalences says that they defined "category" to define "functor", and "functor" to define "natural transformation". But I get the impression that the category theorists of today don't take that remark all that seriously.
                                        – Uday Reddy
                                        Dec 7 '13 at 18:44














                                      • 2




                                        Eilenberg and Mac Lane's original paper: General theory of natural equivalences says that they defined "category" to define "functor", and "functor" to define "natural transformation". But I get the impression that the category theorists of today don't take that remark all that seriously.
                                        – Uday Reddy
                                        Dec 7 '13 at 18:44








                                      2




                                      2




                                      Eilenberg and Mac Lane's original paper: General theory of natural equivalences says that they defined "category" to define "functor", and "functor" to define "natural transformation". But I get the impression that the category theorists of today don't take that remark all that seriously.
                                      – Uday Reddy
                                      Dec 7 '13 at 18:44




                                      Eilenberg and Mac Lane's original paper: General theory of natural equivalences says that they defined "category" to define "functor", and "functor" to define "natural transformation". But I get the impression that the category theorists of today don't take that remark all that seriously.
                                      – Uday Reddy
                                      Dec 7 '13 at 18:44










                                      up vote
                                      12
                                      down vote













                                      I've read a fair amount of Sets for Mathematics and found it to be a gentle introduction.



                                      http://www.amazon.com/Sets-Mathematics-F-William-Lawvere/dp/0521010608/ref=pd_sim_b_5






                                      share|cite|improve this answer



























                                        up vote
                                        12
                                        down vote













                                        I've read a fair amount of Sets for Mathematics and found it to be a gentle introduction.



                                        http://www.amazon.com/Sets-Mathematics-F-William-Lawvere/dp/0521010608/ref=pd_sim_b_5






                                        share|cite|improve this answer

























                                          up vote
                                          12
                                          down vote










                                          up vote
                                          12
                                          down vote









                                          I've read a fair amount of Sets for Mathematics and found it to be a gentle introduction.



                                          http://www.amazon.com/Sets-Mathematics-F-William-Lawvere/dp/0521010608/ref=pd_sim_b_5






                                          share|cite|improve this answer














                                          I've read a fair amount of Sets for Mathematics and found it to be a gentle introduction.



                                          http://www.amazon.com/Sets-Mathematics-F-William-Lawvere/dp/0521010608/ref=pd_sim_b_5







                                          share|cite|improve this answer














                                          share|cite|improve this answer



                                          share|cite|improve this answer








                                          answered Jul 24 '10 at 20:40


























                                          community wiki





                                          Jonathan Fischoff























                                              up vote
                                              11
                                              down vote













                                              Emily Riehl's recently published book Category theory in context is a fantastic introductory text for those interested in seeing lots of examples of where category theory arises in various mathematical disciplines. Understand the examples from other branches of mathematics requires some mathematical maturity (e.g., a bit of exposure to algebra and topology), but these examples aren't strictly necessary to understand the category theory; even the less advanced reader should have no problem understanding the categorical content of the text. It stresses the importance of representability, an understanding of which is crucial if the reader wants to go on to learn about $ 2 $-categories in the future. It's elegantly written, well-motivated, uses very clear notation, and overall is refreshingly clear in its exposition.



                                              The current version of the text is available at http://www.math.jhu.edu/~eriehl/context.pdf and errata in the published version are being updated. The text is new, so it's not as well-known as other texts, but it's so well-written that it seems very likely that it will soon become a mainstay in the world of category theory texts.



                                              9 July 2017 Edit. Updated the link to the text.






                                              share|cite|improve this answer



























                                                up vote
                                                11
                                                down vote













                                                Emily Riehl's recently published book Category theory in context is a fantastic introductory text for those interested in seeing lots of examples of where category theory arises in various mathematical disciplines. Understand the examples from other branches of mathematics requires some mathematical maturity (e.g., a bit of exposure to algebra and topology), but these examples aren't strictly necessary to understand the category theory; even the less advanced reader should have no problem understanding the categorical content of the text. It stresses the importance of representability, an understanding of which is crucial if the reader wants to go on to learn about $ 2 $-categories in the future. It's elegantly written, well-motivated, uses very clear notation, and overall is refreshingly clear in its exposition.



                                                The current version of the text is available at http://www.math.jhu.edu/~eriehl/context.pdf and errata in the published version are being updated. The text is new, so it's not as well-known as other texts, but it's so well-written that it seems very likely that it will soon become a mainstay in the world of category theory texts.



                                                9 July 2017 Edit. Updated the link to the text.






                                                share|cite|improve this answer

























                                                  up vote
                                                  11
                                                  down vote










                                                  up vote
                                                  11
                                                  down vote









                                                  Emily Riehl's recently published book Category theory in context is a fantastic introductory text for those interested in seeing lots of examples of where category theory arises in various mathematical disciplines. Understand the examples from other branches of mathematics requires some mathematical maturity (e.g., a bit of exposure to algebra and topology), but these examples aren't strictly necessary to understand the category theory; even the less advanced reader should have no problem understanding the categorical content of the text. It stresses the importance of representability, an understanding of which is crucial if the reader wants to go on to learn about $ 2 $-categories in the future. It's elegantly written, well-motivated, uses very clear notation, and overall is refreshingly clear in its exposition.



                                                  The current version of the text is available at http://www.math.jhu.edu/~eriehl/context.pdf and errata in the published version are being updated. The text is new, so it's not as well-known as other texts, but it's so well-written that it seems very likely that it will soon become a mainstay in the world of category theory texts.



                                                  9 July 2017 Edit. Updated the link to the text.






                                                  share|cite|improve this answer














                                                  Emily Riehl's recently published book Category theory in context is a fantastic introductory text for those interested in seeing lots of examples of where category theory arises in various mathematical disciplines. Understand the examples from other branches of mathematics requires some mathematical maturity (e.g., a bit of exposure to algebra and topology), but these examples aren't strictly necessary to understand the category theory; even the less advanced reader should have no problem understanding the categorical content of the text. It stresses the importance of representability, an understanding of which is crucial if the reader wants to go on to learn about $ 2 $-categories in the future. It's elegantly written, well-motivated, uses very clear notation, and overall is refreshingly clear in its exposition.



                                                  The current version of the text is available at http://www.math.jhu.edu/~eriehl/context.pdf and errata in the published version are being updated. The text is new, so it's not as well-known as other texts, but it's so well-written that it seems very likely that it will soon become a mainstay in the world of category theory texts.



                                                  9 July 2017 Edit. Updated the link to the text.







                                                  share|cite|improve this answer














                                                  share|cite|improve this answer



                                                  share|cite|improve this answer








                                                  edited Jul 9 '17 at 21:19


























                                                  community wiki





                                                  6 revs
                                                  Peter Haine























                                                      up vote
                                                      10
                                                      down vote













                                                      Arbib, Arrows, Structures, and Functors: The Categorical Imperative



                                                      More elementary than MacLane.



                                                      I don't know very much about this, but some stripes of computer scientist have taken an interest in category theory recently, and there are lecture notes floating around with that orientation.






                                                      share|cite|improve this answer



























                                                        up vote
                                                        10
                                                        down vote













                                                        Arbib, Arrows, Structures, and Functors: The Categorical Imperative



                                                        More elementary than MacLane.



                                                        I don't know very much about this, but some stripes of computer scientist have taken an interest in category theory recently, and there are lecture notes floating around with that orientation.






                                                        share|cite|improve this answer

























                                                          up vote
                                                          10
                                                          down vote










                                                          up vote
                                                          10
                                                          down vote









                                                          Arbib, Arrows, Structures, and Functors: The Categorical Imperative



                                                          More elementary than MacLane.



                                                          I don't know very much about this, but some stripes of computer scientist have taken an interest in category theory recently, and there are lecture notes floating around with that orientation.






                                                          share|cite|improve this answer














                                                          Arbib, Arrows, Structures, and Functors: The Categorical Imperative



                                                          More elementary than MacLane.



                                                          I don't know very much about this, but some stripes of computer scientist have taken an interest in category theory recently, and there are lecture notes floating around with that orientation.







                                                          share|cite|improve this answer














                                                          share|cite|improve this answer



                                                          share|cite|improve this answer








                                                          answered Jul 21 '10 at 20:35


























                                                          community wiki





                                                          Jamie Banks























                                                              up vote
                                                              9
                                                              down vote













                                                              Wikipedia has some nice free texts linked at the bottom. There's an online version of Abstract and Concrete Categories, for example.



                                                              Steve Awodey has some lecture notes available online too. (Awodey's newish book is expensive, but probably rather good)



                                                              Patrick Schultz's answer, and BBischoff's comment on an earlier answer also have good links to freely available resources.






                                                              share|cite|improve this answer



























                                                                up vote
                                                                9
                                                                down vote













                                                                Wikipedia has some nice free texts linked at the bottom. There's an online version of Abstract and Concrete Categories, for example.



                                                                Steve Awodey has some lecture notes available online too. (Awodey's newish book is expensive, but probably rather good)



                                                                Patrick Schultz's answer, and BBischoff's comment on an earlier answer also have good links to freely available resources.






                                                                share|cite|improve this answer

























                                                                  up vote
                                                                  9
                                                                  down vote










                                                                  up vote
                                                                  9
                                                                  down vote









                                                                  Wikipedia has some nice free texts linked at the bottom. There's an online version of Abstract and Concrete Categories, for example.



                                                                  Steve Awodey has some lecture notes available online too. (Awodey's newish book is expensive, but probably rather good)



                                                                  Patrick Schultz's answer, and BBischoff's comment on an earlier answer also have good links to freely available resources.






                                                                  share|cite|improve this answer














                                                                  Wikipedia has some nice free texts linked at the bottom. There's an online version of Abstract and Concrete Categories, for example.



                                                                  Steve Awodey has some lecture notes available online too. (Awodey's newish book is expensive, but probably rather good)



                                                                  Patrick Schultz's answer, and BBischoff's comment on an earlier answer also have good links to freely available resources.







                                                                  share|cite|improve this answer














                                                                  share|cite|improve this answer



                                                                  share|cite|improve this answer








                                                                  answered Aug 4 '10 at 7:39


























                                                                  community wiki





                                                                  Seamus























                                                                      up vote
                                                                      7
                                                                      down vote













                                                                      MATH 4135/5135: Introduction to Category Theory by Peter Selinger
                                                                      (17pp). Concise course outline. Only wish it covered more topics. Available in PS or PDF format.

                                                                      http://www.mscs.dal.ca/~selinger/4135/



                                                                      Handbook of Categorical Algebra (Encyclopedia of Mathematics and its Applications) by Francis Borceux. Rigorous. Comprehensive. This is NOT free, but you can see the contents/index/excerpts at the publisher's web site, listed below. This is a three volume set:

                                                                      (v. 1) Basic Category Theory, 364pp. (ISBN-13: 9780521441780)

                                                                      http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441780


                                                                      (v. 2) Categories and Structures, 464pp. (ISBN-13: 9780521441797)

                                                                      http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441797


                                                                      (v. 3) Sheaf Theory, 544pp. (ISBN-13: 9780521441803)

                                                                      http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441803



                                                                      Reprints in Theory and Applications of Categories (TAC). This site has 18 books and articles on category theory in PDF, including several by F.W. Lawvere.

                                                                      http://www.tac.mta.ca/tac/reprints/index.html



                                                                      Abstract and Concrete Categories-The Joy of Cats by Jirı Adamek, Horst Herrlich, and George E. Strecker (524pp). Free PDF. Published under the GNU Free Documentation License. Mentioned already by Seamus in reference to Wikipedia's external links for Category Theory, but worth repeating, because it's very readable.

                                                                      http://katmat.math.uni-bremen.de/acc



                                                                      A Gentle Introduction to Category Theory (the calculational approach) by Maarten M. Fokkinga (80pp).

                                                                      http://wwwhome.cs.utwente.nl/~fokkinga/mmf92b.html






                                                                      share|cite|improve this answer



























                                                                        up vote
                                                                        7
                                                                        down vote













                                                                        MATH 4135/5135: Introduction to Category Theory by Peter Selinger
                                                                        (17pp). Concise course outline. Only wish it covered more topics. Available in PS or PDF format.

                                                                        http://www.mscs.dal.ca/~selinger/4135/



                                                                        Handbook of Categorical Algebra (Encyclopedia of Mathematics and its Applications) by Francis Borceux. Rigorous. Comprehensive. This is NOT free, but you can see the contents/index/excerpts at the publisher's web site, listed below. This is a three volume set:

                                                                        (v. 1) Basic Category Theory, 364pp. (ISBN-13: 9780521441780)

                                                                        http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441780


                                                                        (v. 2) Categories and Structures, 464pp. (ISBN-13: 9780521441797)

                                                                        http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441797


                                                                        (v. 3) Sheaf Theory, 544pp. (ISBN-13: 9780521441803)

                                                                        http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441803



                                                                        Reprints in Theory and Applications of Categories (TAC). This site has 18 books and articles on category theory in PDF, including several by F.W. Lawvere.

                                                                        http://www.tac.mta.ca/tac/reprints/index.html



                                                                        Abstract and Concrete Categories-The Joy of Cats by Jirı Adamek, Horst Herrlich, and George E. Strecker (524pp). Free PDF. Published under the GNU Free Documentation License. Mentioned already by Seamus in reference to Wikipedia's external links for Category Theory, but worth repeating, because it's very readable.

                                                                        http://katmat.math.uni-bremen.de/acc



                                                                        A Gentle Introduction to Category Theory (the calculational approach) by Maarten M. Fokkinga (80pp).

                                                                        http://wwwhome.cs.utwente.nl/~fokkinga/mmf92b.html






                                                                        share|cite|improve this answer

























                                                                          up vote
                                                                          7
                                                                          down vote










                                                                          up vote
                                                                          7
                                                                          down vote









                                                                          MATH 4135/5135: Introduction to Category Theory by Peter Selinger
                                                                          (17pp). Concise course outline. Only wish it covered more topics. Available in PS or PDF format.

                                                                          http://www.mscs.dal.ca/~selinger/4135/



                                                                          Handbook of Categorical Algebra (Encyclopedia of Mathematics and its Applications) by Francis Borceux. Rigorous. Comprehensive. This is NOT free, but you can see the contents/index/excerpts at the publisher's web site, listed below. This is a three volume set:

                                                                          (v. 1) Basic Category Theory, 364pp. (ISBN-13: 9780521441780)

                                                                          http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441780


                                                                          (v. 2) Categories and Structures, 464pp. (ISBN-13: 9780521441797)

                                                                          http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441797


                                                                          (v. 3) Sheaf Theory, 544pp. (ISBN-13: 9780521441803)

                                                                          http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441803



                                                                          Reprints in Theory and Applications of Categories (TAC). This site has 18 books and articles on category theory in PDF, including several by F.W. Lawvere.

                                                                          http://www.tac.mta.ca/tac/reprints/index.html



                                                                          Abstract and Concrete Categories-The Joy of Cats by Jirı Adamek, Horst Herrlich, and George E. Strecker (524pp). Free PDF. Published under the GNU Free Documentation License. Mentioned already by Seamus in reference to Wikipedia's external links for Category Theory, but worth repeating, because it's very readable.

                                                                          http://katmat.math.uni-bremen.de/acc



                                                                          A Gentle Introduction to Category Theory (the calculational approach) by Maarten M. Fokkinga (80pp).

                                                                          http://wwwhome.cs.utwente.nl/~fokkinga/mmf92b.html






                                                                          share|cite|improve this answer














                                                                          MATH 4135/5135: Introduction to Category Theory by Peter Selinger
                                                                          (17pp). Concise course outline. Only wish it covered more topics. Available in PS or PDF format.

                                                                          http://www.mscs.dal.ca/~selinger/4135/



                                                                          Handbook of Categorical Algebra (Encyclopedia of Mathematics and its Applications) by Francis Borceux. Rigorous. Comprehensive. This is NOT free, but you can see the contents/index/excerpts at the publisher's web site, listed below. This is a three volume set:

                                                                          (v. 1) Basic Category Theory, 364pp. (ISBN-13: 9780521441780)

                                                                          http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441780


                                                                          (v. 2) Categories and Structures, 464pp. (ISBN-13: 9780521441797)

                                                                          http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441797


                                                                          (v. 3) Sheaf Theory, 544pp. (ISBN-13: 9780521441803)

                                                                          http://www.cambridge.org/catalogue/catalogue.asp?isbn=9780521441803



                                                                          Reprints in Theory and Applications of Categories (TAC). This site has 18 books and articles on category theory in PDF, including several by F.W. Lawvere.

                                                                          http://www.tac.mta.ca/tac/reprints/index.html



                                                                          Abstract and Concrete Categories-The Joy of Cats by Jirı Adamek, Horst Herrlich, and George E. Strecker (524pp). Free PDF. Published under the GNU Free Documentation License. Mentioned already by Seamus in reference to Wikipedia's external links for Category Theory, but worth repeating, because it's very readable.

                                                                          http://katmat.math.uni-bremen.de/acc



                                                                          A Gentle Introduction to Category Theory (the calculational approach) by Maarten M. Fokkinga (80pp).

                                                                          http://wwwhome.cs.utwente.nl/~fokkinga/mmf92b.html







                                                                          share|cite|improve this answer














                                                                          share|cite|improve this answer



                                                                          share|cite|improve this answer








                                                                          answered Oct 1 '10 at 7:15


























                                                                          community wiki





                                                                          A. N. Other























                                                                              up vote
                                                                              7
                                                                              down vote













                                                                              Barr and Wells, in addition to Toposes, Triples and Theories, have written Category Theory for the Computing Sciences, a comprehensive tome which goes through most of the interesting aspects of category theory with a constant explicit drive to relate everything to computer science whenever possible.



                                                                              Both books are available online as TAC Reprints.






                                                                              share|cite|improve this answer



























                                                                                up vote
                                                                                7
                                                                                down vote













                                                                                Barr and Wells, in addition to Toposes, Triples and Theories, have written Category Theory for the Computing Sciences, a comprehensive tome which goes through most of the interesting aspects of category theory with a constant explicit drive to relate everything to computer science whenever possible.



                                                                                Both books are available online as TAC Reprints.






                                                                                share|cite|improve this answer

























                                                                                  up vote
                                                                                  7
                                                                                  down vote










                                                                                  up vote
                                                                                  7
                                                                                  down vote









                                                                                  Barr and Wells, in addition to Toposes, Triples and Theories, have written Category Theory for the Computing Sciences, a comprehensive tome which goes through most of the interesting aspects of category theory with a constant explicit drive to relate everything to computer science whenever possible.



                                                                                  Both books are available online as TAC Reprints.






                                                                                  share|cite|improve this answer














                                                                                  Barr and Wells, in addition to Toposes, Triples and Theories, have written Category Theory for the Computing Sciences, a comprehensive tome which goes through most of the interesting aspects of category theory with a constant explicit drive to relate everything to computer science whenever possible.



                                                                                  Both books are available online as TAC Reprints.







                                                                                  share|cite|improve this answer














                                                                                  share|cite|improve this answer



                                                                                  share|cite|improve this answer








                                                                                  edited Nov 15 '17 at 9:57


























                                                                                  community wiki





                                                                                  2 revs, 2 users 71%
                                                                                  Arnaud D.























                                                                                      up vote
                                                                                      5
                                                                                      down vote













                                                                                      First Chapter of Jacobson's Basic Algebra -II.






                                                                                      share|cite|improve this answer



























                                                                                        up vote
                                                                                        5
                                                                                        down vote













                                                                                        First Chapter of Jacobson's Basic Algebra -II.






                                                                                        share|cite|improve this answer

























                                                                                          up vote
                                                                                          5
                                                                                          down vote










                                                                                          up vote
                                                                                          5
                                                                                          down vote









                                                                                          First Chapter of Jacobson's Basic Algebra -II.






                                                                                          share|cite|improve this answer














                                                                                          First Chapter of Jacobson's Basic Algebra -II.







                                                                                          share|cite|improve this answer














                                                                                          share|cite|improve this answer



                                                                                          share|cite|improve this answer








                                                                                          answered Jul 28 '10 at 17:47


























                                                                                          community wiki





                                                                                          user218























                                                                                              up vote
                                                                                              5
                                                                                              down vote













                                                                                              Last year the book Basic Category Theory by Tom Leinster was published by Cambridge University Press. I think it can serve very well as an introduction to Category Theory. It covers much less than Mac Lane's Categories for a working mathematician, but motivates concepts better.






                                                                                              share|cite|improve this answer



























                                                                                                up vote
                                                                                                5
                                                                                                down vote













                                                                                                Last year the book Basic Category Theory by Tom Leinster was published by Cambridge University Press. I think it can serve very well as an introduction to Category Theory. It covers much less than Mac Lane's Categories for a working mathematician, but motivates concepts better.






                                                                                                share|cite|improve this answer

























                                                                                                  up vote
                                                                                                  5
                                                                                                  down vote










                                                                                                  up vote
                                                                                                  5
                                                                                                  down vote









                                                                                                  Last year the book Basic Category Theory by Tom Leinster was published by Cambridge University Press. I think it can serve very well as an introduction to Category Theory. It covers much less than Mac Lane's Categories for a working mathematician, but motivates concepts better.






                                                                                                  share|cite|improve this answer














                                                                                                  Last year the book Basic Category Theory by Tom Leinster was published by Cambridge University Press. I think it can serve very well as an introduction to Category Theory. It covers much less than Mac Lane's Categories for a working mathematician, but motivates concepts better.







                                                                                                  share|cite|improve this answer














                                                                                                  share|cite|improve this answer



                                                                                                  share|cite|improve this answer








                                                                                                  answered Feb 8 '15 at 13:16


























                                                                                                  community wiki





                                                                                                  user44400























                                                                                                      up vote
                                                                                                      3
                                                                                                      down vote













                                                                                                      Lawvere, Rosebrugh. Sets for Mathematics.



                                                                                                      Pierce B. C. Basic category theory for computer scientists.



                                                                                                      José L. Fiadeiro. Categories for Software Engineering.



                                                                                                      Martini. Elements of Basic Category Theory.



                                                                                                      Burstall, Rydeheard. Computational category theory. Requires ML background.






                                                                                                      share|cite|improve this answer



























                                                                                                        up vote
                                                                                                        3
                                                                                                        down vote













                                                                                                        Lawvere, Rosebrugh. Sets for Mathematics.



                                                                                                        Pierce B. C. Basic category theory for computer scientists.



                                                                                                        José L. Fiadeiro. Categories for Software Engineering.



                                                                                                        Martini. Elements of Basic Category Theory.



                                                                                                        Burstall, Rydeheard. Computational category theory. Requires ML background.






                                                                                                        share|cite|improve this answer

























                                                                                                          up vote
                                                                                                          3
                                                                                                          down vote










                                                                                                          up vote
                                                                                                          3
                                                                                                          down vote









                                                                                                          Lawvere, Rosebrugh. Sets for Mathematics.



                                                                                                          Pierce B. C. Basic category theory for computer scientists.



                                                                                                          José L. Fiadeiro. Categories for Software Engineering.



                                                                                                          Martini. Elements of Basic Category Theory.



                                                                                                          Burstall, Rydeheard. Computational category theory. Requires ML background.






                                                                                                          share|cite|improve this answer














                                                                                                          Lawvere, Rosebrugh. Sets for Mathematics.



                                                                                                          Pierce B. C. Basic category theory for computer scientists.



                                                                                                          José L. Fiadeiro. Categories for Software Engineering.



                                                                                                          Martini. Elements of Basic Category Theory.



                                                                                                          Burstall, Rydeheard. Computational category theory. Requires ML background.







                                                                                                          share|cite|improve this answer














                                                                                                          share|cite|improve this answer



                                                                                                          share|cite|improve this answer








                                                                                                          answered Feb 13 '11 at 4:39


























                                                                                                          community wiki





                                                                                                          beroal























                                                                                                              up vote
                                                                                                              3
                                                                                                              down vote













                                                                                                              "Basic category theory"is a script by Jaap van Oosten from Utrecht university (u can find more scripts on topos theory and intuitionism there).
                                                                                                              Advanced is Introduction in Higher order categorical logic by Lambek & Scott. The 3 vols. from Borceux aswell as Johnstone: Sketches of an elephant, 1-2 are very readable reference for looking up proofs and technical details. Toposes and local set theories by Bell is availlable in Dover prints.






                                                                                                              share|cite|improve this answer



























                                                                                                                up vote
                                                                                                                3
                                                                                                                down vote













                                                                                                                "Basic category theory"is a script by Jaap van Oosten from Utrecht university (u can find more scripts on topos theory and intuitionism there).
                                                                                                                Advanced is Introduction in Higher order categorical logic by Lambek & Scott. The 3 vols. from Borceux aswell as Johnstone: Sketches of an elephant, 1-2 are very readable reference for looking up proofs and technical details. Toposes and local set theories by Bell is availlable in Dover prints.






                                                                                                                share|cite|improve this answer

























                                                                                                                  up vote
                                                                                                                  3
                                                                                                                  down vote










                                                                                                                  up vote
                                                                                                                  3
                                                                                                                  down vote









                                                                                                                  "Basic category theory"is a script by Jaap van Oosten from Utrecht university (u can find more scripts on topos theory and intuitionism there).
                                                                                                                  Advanced is Introduction in Higher order categorical logic by Lambek & Scott. The 3 vols. from Borceux aswell as Johnstone: Sketches of an elephant, 1-2 are very readable reference for looking up proofs and technical details. Toposes and local set theories by Bell is availlable in Dover prints.






                                                                                                                  share|cite|improve this answer














                                                                                                                  "Basic category theory"is a script by Jaap van Oosten from Utrecht university (u can find more scripts on topos theory and intuitionism there).
                                                                                                                  Advanced is Introduction in Higher order categorical logic by Lambek & Scott. The 3 vols. from Borceux aswell as Johnstone: Sketches of an elephant, 1-2 are very readable reference for looking up proofs and technical details. Toposes and local set theories by Bell is availlable in Dover prints.







                                                                                                                  share|cite|improve this answer














                                                                                                                  share|cite|improve this answer



                                                                                                                  share|cite|improve this answer








                                                                                                                  edited Sep 4 '14 at 13:24


























                                                                                                                  community wiki





                                                                                                                  4 revs
                                                                                                                  YonedaLemma























                                                                                                                      up vote
                                                                                                                      3
                                                                                                                      down vote














                                                                                                                      • Appendix of Abstract-Algebra by Dummit & Foote http://www.amazon.com/Abstract-Algebra-Edition-David-Dummit/dp/0471433349

                                                                                                                      • An introduction to Category theory by Harold Simmons http://www.amazon.com/Introduction-Category-Theory-Harold-Simmons/dp/0521283043/

                                                                                                                      • A course in Homological algebra - Hilton and Stammbach http://www.amazon.com/Course-Homological-Algebra-Graduate-Mathematics/dp/0387948236/






                                                                                                                      share|cite|improve this answer



























                                                                                                                        up vote
                                                                                                                        3
                                                                                                                        down vote














                                                                                                                        • Appendix of Abstract-Algebra by Dummit & Foote http://www.amazon.com/Abstract-Algebra-Edition-David-Dummit/dp/0471433349

                                                                                                                        • An introduction to Category theory by Harold Simmons http://www.amazon.com/Introduction-Category-Theory-Harold-Simmons/dp/0521283043/

                                                                                                                        • A course in Homological algebra - Hilton and Stammbach http://www.amazon.com/Course-Homological-Algebra-Graduate-Mathematics/dp/0387948236/






                                                                                                                        share|cite|improve this answer

























                                                                                                                          up vote
                                                                                                                          3
                                                                                                                          down vote










                                                                                                                          up vote
                                                                                                                          3
                                                                                                                          down vote










                                                                                                                          • Appendix of Abstract-Algebra by Dummit & Foote http://www.amazon.com/Abstract-Algebra-Edition-David-Dummit/dp/0471433349

                                                                                                                          • An introduction to Category theory by Harold Simmons http://www.amazon.com/Introduction-Category-Theory-Harold-Simmons/dp/0521283043/

                                                                                                                          • A course in Homological algebra - Hilton and Stammbach http://www.amazon.com/Course-Homological-Algebra-Graduate-Mathematics/dp/0387948236/






                                                                                                                          share|cite|improve this answer















                                                                                                                          • Appendix of Abstract-Algebra by Dummit & Foote http://www.amazon.com/Abstract-Algebra-Edition-David-Dummit/dp/0471433349

                                                                                                                          • An introduction to Category theory by Harold Simmons http://www.amazon.com/Introduction-Category-Theory-Harold-Simmons/dp/0521283043/

                                                                                                                          • A course in Homological algebra - Hilton and Stammbach http://www.amazon.com/Course-Homological-Algebra-Graduate-Mathematics/dp/0387948236/







                                                                                                                          share|cite|improve this answer














                                                                                                                          share|cite|improve this answer



                                                                                                                          share|cite|improve this answer








                                                                                                                          answered Sep 12 '14 at 18:22


























                                                                                                                          community wiki





                                                                                                                          user87543























                                                                                                                              up vote
                                                                                                                              3
                                                                                                                              down vote













                                                                                                                              I'm surprised that this hasn't been mentioned already.



                                                                                                                              "Category Theory: An Introduction" by Herrlich and Strecker. You can find this book in either the Allyn and Bacon Series in Advanced Mathematics or Sigma Series in Pure Mathematics.



                                                                                                                              Herrlich and Strecker co-authored another book called "Abstract and Concrete Categories: The Joy of Cats" which is not nearly as good as the former book.






                                                                                                                              share|cite|improve this answer



























                                                                                                                                up vote
                                                                                                                                3
                                                                                                                                down vote













                                                                                                                                I'm surprised that this hasn't been mentioned already.



                                                                                                                                "Category Theory: An Introduction" by Herrlich and Strecker. You can find this book in either the Allyn and Bacon Series in Advanced Mathematics or Sigma Series in Pure Mathematics.



                                                                                                                                Herrlich and Strecker co-authored another book called "Abstract and Concrete Categories: The Joy of Cats" which is not nearly as good as the former book.






                                                                                                                                share|cite|improve this answer

























                                                                                                                                  up vote
                                                                                                                                  3
                                                                                                                                  down vote










                                                                                                                                  up vote
                                                                                                                                  3
                                                                                                                                  down vote









                                                                                                                                  I'm surprised that this hasn't been mentioned already.



                                                                                                                                  "Category Theory: An Introduction" by Herrlich and Strecker. You can find this book in either the Allyn and Bacon Series in Advanced Mathematics or Sigma Series in Pure Mathematics.



                                                                                                                                  Herrlich and Strecker co-authored another book called "Abstract and Concrete Categories: The Joy of Cats" which is not nearly as good as the former book.






                                                                                                                                  share|cite|improve this answer














                                                                                                                                  I'm surprised that this hasn't been mentioned already.



                                                                                                                                  "Category Theory: An Introduction" by Herrlich and Strecker. You can find this book in either the Allyn and Bacon Series in Advanced Mathematics or Sigma Series in Pure Mathematics.



                                                                                                                                  Herrlich and Strecker co-authored another book called "Abstract and Concrete Categories: The Joy of Cats" which is not nearly as good as the former book.







                                                                                                                                  share|cite|improve this answer














                                                                                                                                  share|cite|improve this answer



                                                                                                                                  share|cite|improve this answer








                                                                                                                                  answered Oct 25 '14 at 22:47


























                                                                                                                                  community wiki





                                                                                                                                  Robert Wolfe























                                                                                                                                      up vote
                                                                                                                                      3
                                                                                                                                      down vote













                                                                                                                                      There's also this Category Theory for Programmers by Bartosz Milewski with the companion video lectures



                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmEnaH_LTkxLI7FMa2HsnawM_
                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmElia1eCEZNvsVscFef9m0dm






                                                                                                                                      share|cite|improve this answer























                                                                                                                                      • really engaging video lectures with a computer programming (Haskel) bend; I'm not a mathematician but I really enjoyed them enough to look for textbooks on category theory
                                                                                                                                        – yosimitsu kodanuri
                                                                                                                                        Sep 23 at 10:03















                                                                                                                                      up vote
                                                                                                                                      3
                                                                                                                                      down vote













                                                                                                                                      There's also this Category Theory for Programmers by Bartosz Milewski with the companion video lectures



                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmEnaH_LTkxLI7FMa2HsnawM_
                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmElia1eCEZNvsVscFef9m0dm






                                                                                                                                      share|cite|improve this answer























                                                                                                                                      • really engaging video lectures with a computer programming (Haskel) bend; I'm not a mathematician but I really enjoyed them enough to look for textbooks on category theory
                                                                                                                                        – yosimitsu kodanuri
                                                                                                                                        Sep 23 at 10:03













                                                                                                                                      up vote
                                                                                                                                      3
                                                                                                                                      down vote










                                                                                                                                      up vote
                                                                                                                                      3
                                                                                                                                      down vote









                                                                                                                                      There's also this Category Theory for Programmers by Bartosz Milewski with the companion video lectures



                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmEnaH_LTkxLI7FMa2HsnawM_
                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmElia1eCEZNvsVscFef9m0dm






                                                                                                                                      share|cite|improve this answer














                                                                                                                                      There's also this Category Theory for Programmers by Bartosz Milewski with the companion video lectures



                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmEnaH_LTkxLI7FMa2HsnawM_
                                                                                                                                      https://www.youtube.com/playlist?list=PLbgaMIhjbmElia1eCEZNvsVscFef9m0dm







                                                                                                                                      share|cite|improve this answer














                                                                                                                                      share|cite|improve this answer



                                                                                                                                      share|cite|improve this answer








                                                                                                                                      answered Nov 15 '17 at 7:28


























                                                                                                                                      community wiki





                                                                                                                                      Jeffrey04













                                                                                                                                      • really engaging video lectures with a computer programming (Haskel) bend; I'm not a mathematician but I really enjoyed them enough to look for textbooks on category theory
                                                                                                                                        – yosimitsu kodanuri
                                                                                                                                        Sep 23 at 10:03


















                                                                                                                                      • really engaging video lectures with a computer programming (Haskel) bend; I'm not a mathematician but I really enjoyed them enough to look for textbooks on category theory
                                                                                                                                        – yosimitsu kodanuri
                                                                                                                                        Sep 23 at 10:03
















                                                                                                                                      really engaging video lectures with a computer programming (Haskel) bend; I'm not a mathematician but I really enjoyed them enough to look for textbooks on category theory
                                                                                                                                      – yosimitsu kodanuri
                                                                                                                                      Sep 23 at 10:03




                                                                                                                                      really engaging video lectures with a computer programming (Haskel) bend; I'm not a mathematician but I really enjoyed them enough to look for textbooks on category theory
                                                                                                                                      – yosimitsu kodanuri
                                                                                                                                      Sep 23 at 10:03










                                                                                                                                      up vote
                                                                                                                                      2
                                                                                                                                      down vote













                                                                                                                                      "Algebra:Rings Modules and Categories" by Carl Faith has alot about category theory,which dos'nt need any topology to understand,but is mixed with all the stuff about algebra,which is also writen in a catigorcal way.






                                                                                                                                      share|cite|improve this answer



























                                                                                                                                        up vote
                                                                                                                                        2
                                                                                                                                        down vote













                                                                                                                                        "Algebra:Rings Modules and Categories" by Carl Faith has alot about category theory,which dos'nt need any topology to understand,but is mixed with all the stuff about algebra,which is also writen in a catigorcal way.






                                                                                                                                        share|cite|improve this answer

























                                                                                                                                          up vote
                                                                                                                                          2
                                                                                                                                          down vote










                                                                                                                                          up vote
                                                                                                                                          2
                                                                                                                                          down vote









                                                                                                                                          "Algebra:Rings Modules and Categories" by Carl Faith has alot about category theory,which dos'nt need any topology to understand,but is mixed with all the stuff about algebra,which is also writen in a catigorcal way.






                                                                                                                                          share|cite|improve this answer














                                                                                                                                          "Algebra:Rings Modules and Categories" by Carl Faith has alot about category theory,which dos'nt need any topology to understand,but is mixed with all the stuff about algebra,which is also writen in a catigorcal way.







                                                                                                                                          share|cite|improve this answer














                                                                                                                                          share|cite|improve this answer



                                                                                                                                          share|cite|improve this answer








                                                                                                                                          answered Oct 25 '14 at 22:36


























                                                                                                                                          community wiki





                                                                                                                                          user160823































                                                                                                                                               

                                                                                                                                              draft saved


                                                                                                                                              draft discarded



















































                                                                                                                                               


                                                                                                                                              draft saved


                                                                                                                                              draft discarded














                                                                                                                                              StackExchange.ready(
                                                                                                                                              function () {
                                                                                                                                              StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fmath.stackexchange.com%2fquestions%2f370%2fgood-books-and-lecture-notes-about-category-theory%23new-answer', 'question_page');
                                                                                                                                              }
                                                                                                                                              );

                                                                                                                                              Post as a guest















                                                                                                                                              Required, but never shown





















































                                                                                                                                              Required, but never shown














                                                                                                                                              Required, but never shown












                                                                                                                                              Required, but never shown







                                                                                                                                              Required, but never shown

































                                                                                                                                              Required, but never shown














                                                                                                                                              Required, but never shown












                                                                                                                                              Required, but never shown







                                                                                                                                              Required, but never shown







                                                                                                                                              Popular posts from this blog

                                                                                                                                              Plaza Victoria

                                                                                                                                              Puebla de Zaragoza

                                                                                                                                              Musa