Homogenization of the higher-order Schr\"odinger-type equations with periodic coefficients

Abstract

In L2( Rd; Cn), we consider a matrix strongly elliptic differential operator A of order 2p, p ≥slant 2. The operator A is given by A = b(D)* g(x/) b(D), >0, where g(x) is a periodic, bounded, and positive definite matrix-valued function, and b(D) is a homogeneous differential operator of order p. We prove that, for fixed τ ∈ R and 0, the operator exponential e-i τ A converges to e-i τ A0 in the norm of operators acting from the Sobolev space Hs( Rd; Cn) (with a suitable s) into L2( Rd; Cn). Here A0 is the effective operator. Sharp-order error estimate is obtained. The results are applied to homogenization of the Cauchy problem for the Schr\"odinger-type equation i ∂τ u = A u + F, u_τ=0 = φ.