Covering graphs, magnetic spectral gaps and applications to polymers and nanoribbons

Abstract

In this article, we analyze the spectrum of discrete magnetic Laplacians (DML) on an infinite covering graph G → G=G / with (Abelian) lattice group and periodic magnetic potential β. We give sufficient conditions for the existence of spectral gaps in the spectrum of the DML and study how these depend on β. The magnetic potential may be interpreted as a control parameter for the spectral bands and gaps. We apply these results to describe the spectral band/gap structure of polymers (polyacetylene) and of nanoribbons in the presence of a constant magnetic field.