The Fundamental Solution of an Elliptic Equation with Singular Drift

Abstract

For n≥ 3, we study the existence and asymptotic properties of the fundamental solution for elliptic operators in nondivergence form, L(x,∂x)=aij(x)∂i∂j+bk(x)∂k, where the aij have modulus of continuity ω(r) satisfying the square-Dini condition and the bk are allowed mild singularities of order r-1ω(r). A singular integral is introduced that controls the existence of the fundamental solution. We give examples that show the singular drift bk∂k may act as a perturbation that does not dramatically change the fundamental solution of Lo=aij∂i∂j, or it could change an operator Lo that does not have a fundamental solution to one that does.