Homogenization of nonstationary periodic Maxwell system in the case of constant permeability

Abstract

In L2( R3; C3), we consider a selfadjoint operator L, >0, given by the differential expression μ0-1/2curl η(x/)-1 curl μ0-1/2 - μ01/2∇ (x/) div μ01/2, where μ0 is a constant positive matrix, a matrix-valued function η(x) and a real-valued function (x) are periodic with respect to some lattice, positive definite and bounded. We study the behavior of the operator-valued functions (τ L1/2) and L-1/2 (τ L1/2) for τ ∈ R and small . It is shown that these operators converge to the corresponding operator-valued functions of the operator L0 in the norm of operators acting from the Sobolev space Hs (with a suitable s) to L2. Here L0 is the effective operator with constant coefficients. Also, an approximation with corrector in the (Hs H1)-norm for the operator L-1/2 (τ L1/2) is obtained. We prove error estimates and study the sharpness of the results regarding the type of the operator norm and regarding the dependence of the estimates on τ. The results are applied to homogenization of the Cauchy problem for the nonstationary Maxwell system in the case where the magnetic permeability is equal to μ0, and the dielectric permittivity is given by the matrix η(x/).