On resolvent approximations of elliptic differential operators with locally periodic coefficients

Abstract

We study the asymptotic behaviour, as the small parameter tends to zero, of the resolvents of uniformly elliptic second-order differential operators with locally periodic coefficients depending on the slow variable x and the fast variable x/, with periodicity only in the fast variable. We provide a construction for the leading terms in the operator asymptotics of these resolvents in the sense of L2-operator-norm convergence with order 2 remainder estimates. We apply the modified method of the first approximation with the usage of the shift.