Green's function for second order parabolic equations with singular lower order coefficients

Abstract

We construct Green's functions for second order parabolic operators of the form Pu=∂t u- div( A ∇ u+ bu)+ c · ∇ u+du in (-∞, ∞) × , where is an open connected set in Rn. It is not necessary that to be bounded and = Rn is not excluded. We assume that the leading coefficients A are bounded and measurable and the lower order coefficients b, c, and d belong to critical mixed norm Lebesgue spaces and satisfy the conditions d- div b 0 and div(b-c) 0. We show that the Green's function has the Gaussian bound in the entire (-∞, ∞) × .