Optimal convergence rates for elliptic homogenization problems in nondivergence-form: analysis and numerical illustrations

Abstract

We study optimal convergence rates in the periodic homogenization of linear elliptic equations of the form -A(x/):D2 u = f subject to a homogeneous Dirichlet boundary condition. We show that the optimal rate for the convergence of u to the solution of the corresponding homogenized problem in the W1,p-norm is O(). We further obtain optimal gradient and Hessian bounds with correction terms taken into account in the Lp-norm. We then provide an explicit c-bad diffusion matrix and use it to perform various numerical experiments, which demonstrate the optimality of the obtained rates.