A regularity theory for parabolic equations with anisotropic non-local operators in Lq(Lp) spaces

Abstract

In this paper, we present an Lq(Lp)-regularity theory for parabolic equations of the form: ∂t u(t,x)=La,b(t)u(t,x)+f(t,x), u(0,x)=0. Here, La,b(t) represents anisotropic non-local operators encompassing the singular anisotropic fractional Laplacian with measurable coefficients: La,0(t)u(x)=Σi=1d ∫R( u(x1,…,xi-1,xi+yi,xi+1,…,xd) - u(x) ) ai(t,yi)|yi|1+αi dyi . To address the anisotropy of the operator, we employ a probabilistic representation of the solution and Calder\'on-Zygmund theory. As applications of our results, we demonstrate the solvability of elliptic equations with anisotropic non-local operators and parabolic equations with isotropic non-local operators.