Higher-order homogenization for equations of linearized elasticity using the operator-asymptotic approach

Abstract

The operator-asymptotic approach was introduced by Lim-Zubrini\'c in [Asymptotic Analysis. 141(4), p. 211-256 (2025)] for the homogenization of an d-periodic composite media. In this article, we consider the setting of three-dimensional linearized elasticity, and extend the approach to obtain higher-order convergence rates. In particular, we consider the so-called ``Bloch approximation'' for vector-valued functions with compact Fourier support, and demonstrate that under such data, the approach provides an expansion that yields an error of order n+1 in L2 and n in H1, for any n.