Homogenization of the Dirichlet problem for elliptic systems: Two-parametric error estimates

Abstract

Let O⊂Rd be a bounded domain of class C1,1. In L2(O;Cn), we study a selfadjoint matrix elliptic second order differential operator BD,, 0<≤slant 1, with the Dirichlet boundary condition. The principal part of the operator is given in a factorized form. The operator involves lower order terms with unbounded coefficients. The coefficients of BD, are periodic and depend on x/. We study the generalized resolvent (BD,-ζ Q0(·/))-1, where Q0 is a periodic bounded and positive definite matrix-valued function, and ζ is a complex-valued parameter. We obtain approximations for the generalized resolvent in the L2(O;Cn)-operator norm and in the norm of operators acting from L2(O;Cn) to the Sobolev space H1(O;Cn), with two-parametric error estimates (depending on and ζ).