Regularity estimates of fractional heat semigroups related with uniformly elliptic operators

Abstract

Let L = - div( A(x) · ∇ ) + V(x) be a second-order uniformly elliptic operator on R n (n≥ 3), where A(x) is a real symmetric matrix satisfying standard ellipticity conditions, and V is a nonnegative potential belonging to the reverse H\"older class. For α ∈ (0,1) , we study regularity estimates of the fractional heat semigroups \ exp (-tL α )\ t > 0 , via the subordination formula and the fundamental solution of the associated uniformly parabolic equation ∂t u + Lu = 0 . This approach avoids the use of Fourier transforms and is applicable to second-order differential operators whose heat kernels satisfy Gaussian upper bounds. As an application, we characterize the Campanato-type space L , γ ( Rn ) via the fractional heat semigroups \exp ( - t L α ) \ t > 0 .