Multipolar potentials and weighted Hardy inequalities
Analysis of PDEs
2022-12-05 v1
Abstract
\begin{abstract} In this paper we state the following weighted Hardy type inequality for any functions in a weighted Sobolev space and for weight functions of a quite general type \begin{equation*} c_{N,\mu} \int_{\R^N}V\,\varphi^2\mu(x)dx\le \int_{\R^N}|\nabla \varphi|^2\mu(x)dx +C_\mu \int_{\R^N}W \varphi^2\mu(x)dx, \end{equation*} where is a multipolar potential and is a bounded function from above depending on . The method to get the result is based on the introduction of a suitable vector value function and on an integral identity that we state in the paper. We prove that the constant in the estimate is optimal by building a suitable sequence of functions. \end{abstract}
Cite
@article{arxiv.2212.00835,
title = {Multipolar potentials and weighted Hardy inequalities},
author = {A. Canale},
journal= {arXiv preprint arXiv:2212.00835},
year = {2022}
}