Limit of the average of the laplacian of a test function and a continuous function












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Let $f$ be a continuous function, and $B(x,r)$ the ball of center $x$ and radius $r>0$ in $ mathbb{R}^{m} $ with $mgeq1$. We know that there exists a test function $phi_{r}(t)$ that is between 0 and 1, its support is in $B(x,r)$ and is equal to 1 on the closure of $B(x,r/2)$. Let $theta$ be a smooth function whose Laplacian is identically 1 everywhere. What is
$$lim_{rto 0}frac{1}{lambda r^{m}}int_{B(x,r)}f(t)Delta(phi_{r}(t)theta(t))dt?$$ ( $lambda$ is the volume of the unit ball in $ mathbb{R}^{m} $ and $Delta$ is the laplacian)










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    1












    $begingroup$


    Let $f$ be a continuous function, and $B(x,r)$ the ball of center $x$ and radius $r>0$ in $ mathbb{R}^{m} $ with $mgeq1$. We know that there exists a test function $phi_{r}(t)$ that is between 0 and 1, its support is in $B(x,r)$ and is equal to 1 on the closure of $B(x,r/2)$. Let $theta$ be a smooth function whose Laplacian is identically 1 everywhere. What is
    $$lim_{rto 0}frac{1}{lambda r^{m}}int_{B(x,r)}f(t)Delta(phi_{r}(t)theta(t))dt?$$ ( $lambda$ is the volume of the unit ball in $ mathbb{R}^{m} $ and $Delta$ is the laplacian)










    share|cite|improve this question











    $endgroup$















      1












      1








      1





      $begingroup$


      Let $f$ be a continuous function, and $B(x,r)$ the ball of center $x$ and radius $r>0$ in $ mathbb{R}^{m} $ with $mgeq1$. We know that there exists a test function $phi_{r}(t)$ that is between 0 and 1, its support is in $B(x,r)$ and is equal to 1 on the closure of $B(x,r/2)$. Let $theta$ be a smooth function whose Laplacian is identically 1 everywhere. What is
      $$lim_{rto 0}frac{1}{lambda r^{m}}int_{B(x,r)}f(t)Delta(phi_{r}(t)theta(t))dt?$$ ( $lambda$ is the volume of the unit ball in $ mathbb{R}^{m} $ and $Delta$ is the laplacian)










      share|cite|improve this question











      $endgroup$




      Let $f$ be a continuous function, and $B(x,r)$ the ball of center $x$ and radius $r>0$ in $ mathbb{R}^{m} $ with $mgeq1$. We know that there exists a test function $phi_{r}(t)$ that is between 0 and 1, its support is in $B(x,r)$ and is equal to 1 on the closure of $B(x,r/2)$. Let $theta$ be a smooth function whose Laplacian is identically 1 everywhere. What is
      $$lim_{rto 0}frac{1}{lambda r^{m}}int_{B(x,r)}f(t)Delta(phi_{r}(t)theta(t))dt?$$ ( $lambda$ is the volume of the unit ball in $ mathbb{R}^{m} $ and $Delta$ is the laplacian)







      real-analysis distribution-theory






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      share|cite|improve this question













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      edited Dec 19 '18 at 6:28







      M. Rahmat

















      asked Dec 19 '18 at 6:12









      M. RahmatM. Rahmat

      291212




      291212






















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