Homogenization for locally periodic elliptic problems on a domain

Abstract

Let be a Lipschitz domain in Rd, and let A=-divA(x,x/)∇ be a strongly elliptic operator on . We suppose that is small and the function A is Lipschitz in the first variable and periodic in the second, so the coefficients of A are locally periodic and rapidly oscillate. Given μ in the resolvent set, we are interested in finding the rates of approximations, as 0, for ( A-μ)-1 and ∇( A-μ)-1 in the operator topology on Lp for suitable p. It is well-known that the rates depend on regularity of the effective operator A0. We prove that if ( A0-μ)-1 and its adjoint are bounded from Lp()n to the Lipschitz--Besov space p1+s()n with s∈(0,1], then the rates are, respectively, s and s/p. The results are applied to the Dirichlet, Neumann and mixed Dirichlet--Neumann problems for strongly elliptic operators with uniformly bounded and VMO coefficients.