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

Abstract

For 0<s<1, we consider the Dirichlet problem for the fractional nonlocal Ornstein--Uhlenbeck equation cases (-+x·∇)su=f&in~\\ u=0&on~∂, cases where is a possibly unbounded open subset of Rn, n≥2. 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 Lp and Lp( L)α regularity estimates in terms of the datum f are obtained by comparing u with half-space solutions.