The fractional nonlocal Ornstein--Uhlenbeck equation, Gaussian symmetrization and regularity

TL;DR

This paper studies a fractional nonlocal Ornstein-Uhlenbeck equation, develops functional frameworks, and uses Gaussian symmetrization to derive regularity estimates for solutions based on the data.

Contribution

It introduces a new approach to analyze fractional nonlocal Ornstein-Uhlenbeck equations using Gaussian symmetrization and establishes novel regularity results.

Findings

Derived concentration comparison estimates for solutions.

Established new $L^p$ regularity estimates.

Extended the functional setting for the nonlocal equation.

Abstract

For $0<s<1$, we consider the Dirichlet problem for the fractional nonlocal Ornstein--Uhlenbeck equation $$\begin{cases} (-\Delta+x\cdot\nabla)^su=f&\hbox{in}~\Omega\\ u=0&\hbox{on}~\partial\Omega, \end{cases}$$ where $\Omega$ is a possibly unbounded open subset of $\mathbb{R}^n$, $n\geq2$. The appropriate functional settings for this nonlocal equation and its corresponding extension problem are developed. We apply Gaussian symmetrization techniques to derive a concentration comparison estimate for solutions. As consequences, novel $L^p$ and $L^p(\log L)^\alpha$ regularity estimates in terms of the datum $f$ are obtained by comparing $u$ with half-space solutions.