Csdrhrt

I want to prove that the geometric Hahn Banach theorem implies the analytic one.

Edit:
To avoid confusion I will state the vesion of H.B theorems im familiar with:

Analytic H.B:

Let $X$ be a linear space(over $Bbb R$) and $Ysubset X$ a subspace. Let $p:X to Bbb R$ be a sub-additive function. Suppose $f:Yto Bbb R$ is a linear map s.t $f(y) le p(y)$ for all $yin Y$ then there exists an extention $g:Xto Bbb R$ of $f$ s.t. $g(x)le p(x) $ for all $xin X$.

Geometric H.B:

Let $X$ be a linear space. $K subset X$ convex s.t. each point in $K$ is an internal point. Let $D$ be a plane disjoint from $K$ then there exists hyperplane that contains $D$ and disjoint from $K$.

In my problem $X$ is NOT a normed space so there are no open sets.

Given $X$ a linear space and $Ysubset X$ a subspace $p:Xto Bbb R$ sub-additive, and $f:Yto Bbb R$ linear s.t $f(y)le p(y)$ for $yin Y$ we need to extend $f$ to $g:Xto Bbb R $ and $g(x)le p(x)$ fo r all $xin X$

So, we look at $X times Bbb R $and define $K = {(x,t) : t>p(x)}$.

The fact that $K$ is convex is easy. How can I show directly that every point in $K$ is internal? (can't say that $K$ is open).

Now after showing that, we can look at $Graph(f)$ and observe that $Graph(f)cap K = emptyset$.

So by the geometric H.B theorem we have a hyperplane (which is a maximal subspace in this case because $(0,0)in Graph(f)$ ) M containing $Graph(f) $ and disjoint from $K$.

Now my problem is to show that each $xin X$ has a unique $tin Bbb R$ s.t. $(x,t) in M$. (I need it in order to extend $f$).

I know that if we take $v_0notin M$ then each $v in X times Bbb R$ has a unique representation as $v = alpha v_0 + m$ for $m in M$ , this is because $M$ is a maximal subspace. not sure if that helps.

Thanks for helping!

Here's another approach, according to guidance in the book Functional Analysis by Prof.s Weiss, Lindenstrauss and Pazi (there's no English translation as far as I'm aware of, sorry) in page 217, Q.13:

Using the notation of the analytical H.B. you've written above, define $K:={xin X:p(x)<1}$, $alpha:=sup_{yin Ycap K}{f(y)}$ and $D:={yin Y:f(y)=alpha}$.

Note that $K$ is convex, and that every point of $K$ is an internal point (take $kin K$ and you can write explicit $epsilon$ for any $yin X$ to show the definition in the link you referred to holds).

If $fequiv 0$ it's easy to extend $f$ to be identically $0$ on all of $X$. Otherwise, there is a $yin Y$ for which $f(y)>0$, and as $Y$ is a vector space and $f$ is linear, we can scale this point to get $f(y_0)=alpha$. Note that $D=ker(f)+y_0$ so it is a plane (an affine subspace).

Lastly note that $Dcap K=emptyset$ (this is true thanks to the definition of $alpha$ as a supremum and $K$ as a preimage of an open interval).

Apply Geometric H.B. and achieve a hyperplane $hat D$ that contains $D$ and does not intersect with $K$ (specifically, $0notinhat D$). So $hat D-y_0$ is a maximal subspace which contains $ker(f)$ and does not contain $y_0$, so we may define the extension of $f$ as $0$ on $hat D-y_0$ and extend linearly. (Note that $Y=ker(f)oplus span{y_0}$ so this definition actually extends $f$).

To apply geometric Hahn-Banach, you need that the space in question is more than just a vector space - it must be a topological vector space, meaning a vector space with a topology such the vector space operations are continuous. So, if we hope to apply geometric Hahn-Banach to the space $Xtimes mathbb{R}$ we better figure out what its open sets are. We know what the topology on $mathbb{R}$ ought to be so what about the topology on $X$? When a vector space has a norm, we may give it a topology via that norm by defining open balls. Here, we are not lucky enough to have a norm but we do have the sub-additive functional $p$, which we should think of as "almost" a norm. This functional $p$ gives us a natural topology on $X$ that makes $K$ open in the product. One way to think about the way in which a norm $||cdot||:Yrightarrow mathbb{R}$ gives $Y$ a topology is to declare that the open sets of $Y$ are just $||cdot ||^{-1}(U)$ where $U$ is open in $mathbb{R}$. You should think about why this does in fact give a topology and why it is the same topology given by defining a basis of open balls. This is called the topology induced by the function $||cdot||$, and it works for any function. Thus, in the same way, we may define a topology on $X$ by declaring the open sets to be $p^{-1}(U)$, where $U$ is open in $mathbb{R}$. Now, we have a vector space with a topology, but we need to check that it is a topological vector space, so the extra requirement mentioned above that the vector space operations are compatible (i.e. continuous w/r/t) the topology. This should come from the fact that $p$ is not any old map, but a sub-additive linear functional. Once we have this we are free to apply geometric Hahn-Banach.