Heat kernels for reflected diffusions with jumps on inner uniform domains

Abstract

In this paper, we study sharp two-sided heat kernel estimates for a large class of symmetric reflected diffusions with jumps on the closure of an inner uniform domain D in a length metric space. The length metric is the intrinsic metric of a strongly local Dirichlet form. When D is an inner uniform domain in the Euclidean space, a prototype for a special case of the processes under consideration are symmetric reflected diffusions with jumps on D, whose infinitesimal generators are non-local (pseudo-differential) operators L on D of the form L u(x) =12 Σi, j=1d ∂∂ xi (aij(x) ∂ u(x)∂ xj) + 0 ∫\y∈ D: \, D(y, x)>\ (u(y)-u(x)) J(x, y)\, dy satisfying "Neumann boundary condition". Here, D(x,y) is the length metric on D, A(x)=(aij(x))1≤ i,j≤ d is a measurable d× d matrix-valued function on D that is uniformly elliptic and bounded, and J(x,y):= 1(D(x,y)) ∫[α1, α2] c(α, x,y) D(x,y)d+α \,(dα) , where is a finite measure on [α1, α2] ⊂ (0, 2), is an increasing function on [ 0, ∞ ) with c1ec2rβ (r) c3 ec4rβ for some β ∈ [0,∞], and c(α , x, y) is a jointly measurable function that is bounded between two positive constants and is symmetric in (x, y).