Homogenization of a parabolic Dirichlet problem by a method of Dahlberg

Abstract

Consider the linear parabolic operator in divergence form H u =∂t u(X,t)-div(A(X)∇ u(X,t)). We employ a method of Dahlberg to show that the Dirichlet problem for H in the upper half plane is well-posed for boundary data in Lp, for any elliptic matrix of coefficients A which is periodic and satisfies a Dini-type condition. This result allows us to treat a homogenization problem for the equation ∂t u(X,t)-div(A(X/)∇ u(X,t)) in Lipschitz domains with Lp-boundary data.