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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.
5
votes
2
answers
296
views
Density character of a metric space is an Ulam number
I am reading this paper and I came across the following sentence:
Throughout the paper we silently assume [...] that the density character (i.e. the minimum cardinality of a
dense subset) of ev …
3
votes
Alberti rank one theorem and a blow-up argument
The answer to your questions 1. & 2. can be found in Theorem 3.95 of the book Ambrosio, Fusco, Pallara Functions of Bounded Variation and Free Discontinuity Problems.
Another very recent and excellen …
14
votes
2
answers
1k
views
Category theory & geometric measure theory?
My background is essentially Geometric Measure Theory and its application to partial differential equations (e.g. linear and non-linear hyperbolic conservation laws). These are currently my research i …
5
votes
1
answer
347
views
Estimate of the difference quotients in terms of an $L^{1,\infty}$ function
Let $f \colon \mathbb R^d \to \mathbb R$ be a measurable function. Consider the following property:
(P) there exist a negligible set $N \subset \mathbb R^d$ and function $T_f \in L^p(\mathbb R^d) …
10
votes
0
answers
170
views
Maximizing an integral w.r.t. a measure on the unit sphere
I would like to know if the answer to the following question is known.
Let $d \ge 3$. What is the value of
$$
\theta(d) := \max_{\mu} \int_{S^{d-1}} \int_{S^{d-1}} \cdots \int_{S^{d-1}} |x_1 \w …
5
votes
0
answers
273
views
Is there any geometrical/homological intuition behind symmetrized gradient?
The gradient/differential/exterior differential/divergence/curl are all strictly related first order differential operators. As far as I understood, they are the base of (co)homological theories in Eu …
5
votes
Accepted
Hausdorff measure of intersection of a ball and a set in $\mathbb {R} ^ n$
Let me state and prove the following:
Proposition. Let $E \subset \mathbb R^n$ be a set of finite perimeter. For $\mathcal L^1$-a.e. $\rho>0$ the following equality holds:
$$
P(E \cap B_{\rho}) …
7
votes
1
answer
489
views
Anisotropic perimeter and regularity of anisotropic minimal surfaces
1. Introduction.
By-now classical results assert that minimal surfaces (in $\mathbb R^n$) are generically "smooth" out of a "small" set.
Question. What are the known regularity results for anis …
13
votes
1
answer
1k
views
Structure of the Cantor part of the derivative of a BV function
It is well known that an integrable function $u \colon \mathbb R^d \to \mathbb R$ is said to be of bounded variation iff the distributional gradient $Du$ is (representable by) a finite Radon measure, …