# Capacitary differentiability of potentials of finite Radon measures

**Authors:** Joan Verdera

arXiv: 1812.11419 · 2019-01-01

## TL;DR

This paper investigates the differentiability of potentials of finite Radon measures using a capacity-based notion, establishing almost everywhere differentiability and Lipschitz estimates, with applications to Newtonian potentials.

## Contribution

It introduces a capacity-based differentiability concept for potentials, strengthening existing results and providing new pointwise Lipschitz estimates for these potentials.

## Key findings

- Almost everywhere differentiability in the capacity sense.
- Weak $L^{N/(N-1)}$ differentiability of potentials.
- Pointwise Lipschitz estimates for potentials.

## Abstract

We study differentiability properties of a potential of the type $K\star \mu$, where $\mu$ is a finite Radon measure in $\mathbb{R}^N$ and the kernel $K$ satisfies $|\nabla^j K(x)| \le C\, |x|^{-(N-1+j)}, \quad j=0,1,2.$   We introduce a notion of differentiability in the capacity sense, where capacity is classical capacity in the de la Vall\'ee Poussin sense associated with the kernel $|x|^{-(N-1)}.$ We require that the first order remainder at a point is small when measured by means of a normalized weak capacity "norm" in balls of small radii centered at the point. This implies weak $L^{N/(N-1)}$ differentiability and thus $L^{p}$ differentiability in the Calder\'on--Zygmund sense for $1\le p < N/(N-1)$. We show that $K\star \mu$ is a.e. differentiable in the capacity sense, thus strengthening a recent result by Ambrosio, Ponce and Rodiac. We also present an alternative proof of a quantitative theorem of the authors just mentioned, giving pointwise Lipschitz estimates for $K\star \mu.$ As an application, we study level sets of newtonian potentials of finite Radon measures.

## Full text

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## References

10 references — full list in the complete paper: https://tomesphere.com/paper/1812.11419/full.md

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Source: https://tomesphere.com/paper/1812.11419