Meyers inequality and strong stability for stable-like operators

Abstract

Let α∈ (0,2), let E(u,u)=∫ Rd∫ Rd (u(y)-u(x))2A(x,y)|x-y|d+α\, dy\, dx be the Dirichlet form for a stable-like operator, let u(x)=∫ Rd (u(y)-u(x))2A(x,y)|x-y|d+α\, dy, let L be the associated infinitesimal generator, and suppose A(x,y) is jointly measurable, symmetric, bounded, and bounded below by a positive constant. We prove that if u is the weak solution to Lu=h, then u∈ Lp for some p>2. This is the analogue of an inequality of Meyers for solutions to divergence form elliptic equations. As an application, we prove strong stability results for stable-like operators. If A is perturbed slightly, we give explicit bounds on how much the semigroup and fundamental solution are perturbed.