Connor Mooney
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Registered User
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Columbia PhD student interested in Partial Differential Equations.
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9h |
answered | analysis question related to $L^p$ type inequalities |
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May 17 |
comment |
analysis question related to $L^p$ type inequalities @Peter: So is the LHS along the diagonal. |
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May 3 |
accepted | What goes wrong for the Sobolev embeddings at $k=n/p$? |
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Apr 18 |
accepted | Sharpness of the Sobolev embedding theorem |
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Apr 12 |
answered | Sharpness of the Sobolev embedding theorem |
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Apr 12 |
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Sharpness of the Sobolev embedding theorem In the case $W^{1,n}$ how do you interpret $C^{-1,1}$? |
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Mar 12 |
revised |
What goes wrong for the Sobolev embeddings at $k=n/p$? added 130 characters in body |
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Mar 12 |
revised |
What goes wrong for the Sobolev embeddings at $k=n/p$? deleted 23 characters in body |
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Mar 12 |
answered | What goes wrong for the Sobolev embeddings at $k=n/p$? |
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Feb 2 |
awarded | ● Commentator |
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Feb 2 |
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a diameter-perimeter-area inequality for convex figures Yes, in restrospect I should have posted this as a comment on your answer- cheers! |
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Feb 2 |
answered | a diameter-perimeter-area inequality for convex figures |
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Jan 17 |
awarded | ● Nice Question |
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Dec 22 |
comment |
variation of the obstacle in the obstacle problem Interesting question! It seems to me that if we start with a convex obstacle (like $f = |x|^2$) and smoothly deform it to an obstacle with "2 humps" something would be irregular; the set where $\phi$ agrees with $f$ will start out as a sphere and pinch off into 2 spheres. |
