Homogenization of the first initial boundary-value problem for parabolic systems: operator error estimates

Abstract

Let O⊂Rd be a bounded domain of class C1,1. In L2(O;Cn), we consider a selfadjoint matrix second order elliptic differential operator BD,, 0<≤slant1, with the Dirichlet boundary condition. The principal part of the operator is given in a factorized form. The operator involves first and zero order terms. The operator BD, is positive definite; its coefficients are periodic and depend on x/. We study the behavior of the operator exponential e-BD,t, t>0, as → 0. We obtain approximations for the exponential e-BD,t in the operator norm on L2(O;Cn) and in the norm of operators acting from L2(O;Cn) to the Sobolev space H1(O;Cn). The results are applied to homogenization of solutions of the first initial boundary-value problem for parabolic systems.