Heat kernel bounds for elliptic partial differential operators in divergence form with Robin-type boundary conditions II

Abstract

The principal aim of this short note is to extend a recent result on Gaussian heat kernel bounds for self-adjoint L2(; dn x)-realizations, n∈, n≥ 2, of divergence form elliptic partial differential expressions L with (nonlocal) Robin-type boundary conditions in bounded Lipschitz domains ⊂ n, where Lu = - Σj,k=1n∂j aj,k∂k u. The (nonlocal) Robin-type boundary conditions are then of the form · A∇ u + [u|∂]=0 \, on \, ∂, where represents an appropriate operator acting on Sobolev spaces associated with the boundary ∂ of , and denotes the outward pointing normal unit vector on ∂.