Dispersive homogenized models and coefficient formulas for waves in general periodic media

Abstract

We analyze a homogenization limit for the linear wave equation of second order. The spatial operator is assumed to be of divergence form with an oscillatory coefficient matrix a that is periodic with characteristic length scale ; no spatial symmetry properties are imposed. Classical homogenization theory allows to describe solutions u well by a non-dispersive wave equation on fixed time intervals (0,T). Instead, when larger time intervals are considered, dispersive effects are observed. In this contribution we present a well-posed weakly dispersive equation with homogeneous coefficients such that its solutions w describe u well on time intervals (0,T-2). More precisely, we provide a norm and uniform error estimates of the form \| u(t) - w(t) \| C for t∈ (0,T-2). They are accompanied by computable formulas for all coefficients in the effective models. We additionally provide an -independent equation of third order that describes dispersion along rays and we present numerical examples.