An operator-asymptotic approach to periodic homogenization for equations of linearized elasticity

Abstract

We present an operator-asymptotic approach to the problem of homogenization of periodic composite media in the setting of three-dimensional linearized elasticity. This is based on a uniform approximation with respect to the inverse wavelength || for the solution to the resolvent problem when written as a superposition of elementary plane waves with wave vector (``quasimomentum") . We develop an asymptotic procedure in powers of ||, combined with a new uniform version of the classical Korn inequality. As a consequence, we obtain L2 L2, L2 H1, and higher-order L2 L2 norm-resolvent estimates in R3. The L2 H1 and higher-order L2 L2 correctors emerge naturally from the asymptotic procedure, and the former is shown to coincide with the classical formulae.