# A class of weighted Hardy inequalities and applications to evolution   problems

**Authors:** Anna Canale, Francesco Pappalardo, Ciro Tarantino

arXiv: 1812.03193 · 2019-04-30

## TL;DR

This paper establishes a class of weighted Hardy inequalities involving Kolmogorov operators with inverse square potentials, demonstrating the optimality of constants and exploring existence and nonexistence results for related evolution problems in a probabilistic setting.

## Contribution

It introduces a new class of weighted Hardy inequalities for Kolmogorov operators with inverse square potentials, extending classical results to a probabilistic framework with optimal constants.

## Key findings

- Proved the optimality of the Hardy inequality constant.
- Derived existence and nonexistence results for evolution problems.
- Extended Cabré-Martel's approach to Kolmogorov operators.

## Abstract

\begin{abstract} We state the following weighted Hardy inequality \begin{equation*} c_{o, \mu}\int_{{\R}^N}\frac{\varphi^2 }{|x|^2}\, d\mu\le \int_{{\R}^N} |\nabla\varphi|^2 \, d\mu +   K \int_{\R^N}\varphi^2 \, d\mu \quad \forall\, \varphi \in H_\mu^1 %\qquad c\le c_\mu, \end{equation*} in the context of the study of the Kolmogorov operators \begin{equation*} Lu=\Delta u+\frac{\nabla \mu}{\mu}\cdot\nabla u \end{equation*} perturbed by inverse square potentials and of the related evolution problems. The function $\mu$ in the drift term is a probability density on $\R^N$. We prove the optimality of the constant $c_{o, \mu}$ and state existence and nonexistence results following the Cabr\'e-Martel's approach \cite{CabreMartel} extended to Kolmogorov operators. \end{abstract}

## Full text

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## References

25 references — full list in the complete paper: https://tomesphere.com/paper/1812.03193/full.md

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Source: https://tomesphere.com/paper/1812.03193