Homogenization for non-self-adjoint locally periodic elliptic operators

Abstract

We study the homogenization problem for matrix strongly elliptic operators on L2( Rd)n of the form A=-divA(x,x/)∇. The function A is Lipschitz in the first variable and periodic in the second. We do not require that A*=A, so A need not be self-adjoint. In this paper, we provide, for small , two terms in the uniform approximation for ( A-μ)-1 and a first term in the uniform approximation for ∇( A-μ)-1. Primary attention is paid to proving sharp-order bounds on the errors of the approximations.