Homogenization of hyperbolic equations with periodic coefficients in Rd: sharpness of the results

Abstract

In L2( Rd; Cn), a selfadjoint strongly elliptic second order differential operator A is considered. It is assumed that the coefficients of the operator A are periodic and depend on x/, where >0 is a small parameter. We find approximations for the operators ( A1/2τ) and A-1/2 ( A1/2τ) in the norm of operators acting from the Sobolev space Hs( Rd) to L2( Rd) (with suitable s). We also find approximation with corrector for the operator A-1/2 ( A1/2τ) in the (Hs H1)-norm. The question about the sharpness of the results with respect to the type of the operator norm and with respect to the dependence of estimates on τ is studied. The results are applied to study the behavior of the solutions of the Cauchy problem for the hyperbolic equation ∂τ2 u = - A u + F.