On homogenization of the first initial-boundary value problem for periodic hyperbolic systems

Abstract

Let O⊂Rd a bounded domain of class C1,1. In L2(O;Cn), we consider a self-adjoint matrix strongly elliptic second order differential operator BD,, 0< ≤slant 1, with the Dirichlet boundary condition. The coefficients of the operator BD, are periodic and depend on x/. We are interested in the behavior of the operators (tBD,1/2) and BD, -1/2 (t BD, 1/2), t∈R, in the small period limit. For these operators, approximations in the norm of operators acting from some subspace H of the Sobolev space H4(O;Cn) to L2(O;Cn) are found. Moreover, for BD, -1/2 (t BD, 1/2), the approximation with the corrector in the norm of operators acting from H⊂ H4(O;Cn) to H1(O;Cn) is obtained. The results are applied to homogenization for the solution of the first initial-boundary value problem for the hyperbolic equation ∂ 2t u =-BD, u .