Perturbation theory for dispersion relations of spacetime-periodic materials

TL;DR

This paper develops a perturbation theory for spacetime-periodic materials, revealing how degeneracies in dispersion relations split into bands, supported by numerical validation.

Contribution

It introduces a novel perturbation approach for spacetime-periodic materials, generalizing the nearly-free electron model to include infinite degeneracies and their splitting into bands.

Findings

Infinite degeneracy in dispersion relations can split into non-degenerate bands.

Perturbation theory results closely match numerical solutions.

Method extends understanding of wave behavior in spacetime-periodic media.

Abstract

We consider Bloch states of weak spacetime-periodic perturbations of homogeneous materials in one spatial dimension. The interplay of space- and time-periodicity leads to an infinitely degenerate dispersion relation in the free case. We consider a general perturbation term, and, as consequence of the infinite degeneracy, we show that the effective equations are given by the eigenvalue problem of an infinite matrix. Our method can be viewed as a time-modulated generalisation of the nearly-free electron model. Based on this result, we find that the infinite degeneracy may split into a family of non-degenerate bands. Our results are illustrated with numerical calculations, and we observe close agreement between the perturbation theory and the numerically computed full solution.