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Questions about geometric properties of sets using measure theoretic techniques; rectifiability of sets and measures, currents, Plateau problem, isoperimetric inequality and related topics.
10
votes
Accepted
Explicit extension of Lipschitz function (Kirszbraun theorem)
I like a recent proof by Akopyan and Tarasov:
A. V. Akopyan, A. S. Tarasov, "A constructive proof of Kirszbraun's
theorem"(Russian), Mat. Zametki 84 (2008), no. 5, 781--784;
translation in Math. Note …
8
votes
Accepted
Minimizing the perimeter around an obstacle
For any sensible definition of perimeter, an adaptation of following argument proves the claim. Consider the nearest-point projection map $p_A:\mathbb R^n\to A$ (that is, for every $x\in\mathbb R^n$, …
4
votes
Generalization of an inequality due to Gage for curve shortening Part II
Your inequality is not true in general. You can have $\int_{\partial\Omega} p^2 dS >\int_{\partial\Omega^*} (p^*)^2 dS^* + C(A^*-A)$ for any $C$ while keeping $L$ and $A$ a priori bounded.
Indeed,
$$ …
4
votes
Accepted
Generalization of an inequality due to Gage for curve shortening
The conjecture is false. Let $ABCD$ be a square inscribed in the unit circle. Consider the following piecewise smooth loop in the plane. First it starts from $A$ and moves between $A$ and $B$ along t …
4
votes
Accepted
Estimating the Hausdorff measure of a subset of the sphere
Yes. Here is an elementary proof.
Construct a distance non-increasing retraction $p:S^{n-1}\setminus B_r(a)\setminus B_r(b)\to \partial B_r(a)$. (For example: divide the sphere into two-hemispheres b …
19
votes
Accepted
Minimal surface which divides a convex body into two regions of equal volume
The conjecture as you state it is false. The variational argument (that can be interpreted in terms of fluid pressure if you like) shows that the surface has constant mean curvature and is orthogonal …