Homogenization of high order elliptic operators with periodic coefficients

Abstract

In L2( Rd; Cn), we study a selfadjoint strongly elliptic operator A of order 2p given by the expression b( D)* g( x/) b( D), >0. Here g( x) is a bounded and positive definite (m× m)-matrix-valued function in Rd; it is assumed that g( x) is periodic with respect to some lattice. Next, b( D)=Σ|α|=pd bα Dα is a differential operator of order p with constant coefficients; bα are constant (m× n)-matrices. It is assumed that m n and that the symbol b( ) has maximal rank. For the resolvent (A - ζ I)-1 with ζ ∈ C [0,∞), we obtain approximations in the norm of operators in L2( Rd; Cn) and in the norm of operators acting from L2( Rd; Cn) to the Sobolev space Hp( Rd; Cn), with error estimates depending on and ζ.