Improved approximations of resolvents in homogenization of fourth-order operators with periodic coefficients

Abstract

In the whole space Rd, d 2, we study homogenization of a divergence form elliptic fourth-order operator A with measurable -periodic coefficients, where is a small parameter. For the resolvent (A+1)-1, acting as an operator from L2 to H2, we find an approximation with remainder term of order O(2) as tends to 0. Relying on this result, we construct the resolvent approximation with remainder of order O(3) in the operator L2-norm. We employ two-scale expansions that involve smoothing.