High-frequency homogenization of nonstationary periodic equations

Abstract

We consider an elliptic differential operator A = - ddx g(x/) ddx + -2 V(x/), > 0, with periodic coefficients acting in L2(R). For the nonstationary Schr\"odinger equation with the Hamiltonian A and for the hyperbolic equation with the operator A, analogs of homogenization problems, related to the edges of the spectral bands of the operator A, are studied (the so called high-frequency homogenization). For the solutions of the Cauchy problems for these equations with special initial data, approximations in L2(R)-norm for small are obtained.