Variations on the theme of the Trotter-Kato theorem for homogenization of periodic hyperbolic systems

Abstract

In L2(Rd;Cn), we consider a matrix elliptic second order differential operator B >0. Coefficients of the operator B are periodic with respect to some lattice in Rd and depend on x/. We study the quantitative homogenization for the solutions of the hyperbolic system ∂ t2u =-Bu. In operator terms, we are interested in approximations of the operators (tB 1/2) and B -1/2 (tB 1/2) in suitable operator norms. Approximations for the resolvent B -1 have been already obtained by T.~A.~Suslina. So, we rewrite hyperbolic equation as a system for the vector with components u and ∂ tu, and consider the corresponding unitary group. For this group, we adapt the proof of the Trotter-Kato theorem by introduction of some correction term and derive hyperbolic results from elliptic ones.