Laplacian perturbed by non-local operators

Abstract

Suppose that d≥ 1 and 0<β<2. We establish the existence and uniqueness of the fundamental solution qb(t, x, y) to the operator Lb=+Sb, where Sbf(x) := ∫Rd ( f(x+z) - f(x) - ∇ f(x) · z1\|z| ≤ 1\ ) b(x, z)|z|d+β dz and b(x, z) is a bounded measurable function on Rd × Rd with b(x, z)=b(x, -z) for x, z∈ Rd. We show that if for each x∈Rd, b(x, z) ≥ 0 for a.e. z∈Rd, then qb(t, x, y) is a strictly positive continuous function and it uniquely determines a conservative Feller process Xb, which has strong Feller property. Furthermore, sharp two-sided estimates on qb(t, x, y) are derived.