Full two-scale asymptotic expansion and higher-order constitutive laws in the homogenisation of the system of Maxwell equations

TL;DR

This paper develops a high-order asymptotic expansion for Maxwell equations in periodic media, leading to advanced homogenized models that incorporate gradient effects of electromagnetic fields.

Contribution

It introduces an infinite-order homogenization method for Maxwell equations, extending classical models with higher-order gradient effects using asymptotic and variational techniques.

Findings

Rigorous convergence estimates for the asymptotic expansion.

Derivation of an infinite-order homogenized Maxwell system.

Extension of strain-gradient theories to electromagnetic systems.

Abstract

For the system of Maxwell equations of electromagnetism in an $l$-periodic composite medium of overall size $L$ ($0<l<L<\infty$), in the low-frequency quasistatic approximation, we develop an electromagnetic version of strain-gradient theories, where the magnetic field is not a function of the magnetic induction alone but also of its spatial gradients, and the electric field depends not only on the displacement but also on displacement gradients. Following the work (Smyshlyaev, V.P., Cherednichenko, K.D., 2000. On rigorous derivation of strain gradient effects in the overall behaviour of periodic heterogeneous media, ${\mathit J.\ Mech.\ Phys.\ Solids\ }{\mathbf{48}},$ $1325-1357$), we develop a combination of variational and asymptotic approaches to the multiscale analysis of the Maxwell system. We provide rigorous convergence estimates of higher order of smallness with respect to the inverse of the "scale separation parameter" $L/l.$ Using a special "ensemble averaging" procedure for a family of periodic problems, we derive an infinite-order version of the classical homogenised system of Maxwell equations.