Harnack inequality for non-local Schr\"odinger operators

Abstract

Let x ∈ Rd, d ≥ 3, and f: Rd → R be a twice differentiable function with all second partial derivatives being continuous. For 1≤ i,j ≤ d, let aij : Rd → R be a differentiable function with all partial derivatives being continuous and bounded. We shall consider the Schr\"odinger operator associated to eqnarray* Lf(x) &=& 12 Σi=1d Σj=1d ∂∂ xi (aij(·) ∂ f∂ xj)(x) + ∫Rd\0\ [f(y) - f(x) ]J(x,y)dy. eqnarray* where J: Rd × Rd → R is a symmetric measurable function. Let q: Rd → R. We specify assumptions on a,q, and J so that non-negative bounded solutions to Lf + qf = 0 satisfy a Harnack inequality. As tools we also prove a Carleson estimate, a Uniform Boundary Harnack Principle and a 3G inequality for solutions to Lf = 0.