Invariants of magnetic Laplacians on periodic graphs

TL;DR

This paper analyzes the spectral properties of magnetic Laplacians on periodic graphs, introducing invariants based on minimal forms that help estimate spectral bands and solve inverse problems.

Contribution

It introduces minimal forms as invariants for magnetic Laplacians on periodic graphs and uses them to analyze spectral properties and inverse problems.

Findings

Decomposition of magnetic Laplacian into a direct integral using minimal forms

Estimation of spectral band positions and measures

Necessary and sufficient conditions for fiber magnetic Laplacians

Abstract

We consider a magnetic Laplacian with periodic magnetic potentials on periodic discrete graphs. Its spectrum consists of a finite number of bands, where degenerate bands are eigenvalues of infinite multiplicity. We obtain a specific decomposition of the magnetic Laplacian into a direct integral in terms of minimal forms. A minimal form is a periodic function defined on edges of the periodic graph with a minimal support on the period. It is crucial that fiber magnetic Laplacians (matrices) have the minimal number of coefficients depending on the quasimomentum and the minimal number of coefficients depending on the magnetic potential. We show that these numbers are invariants for the magnetic Laplacians on periodic graphs. Using this decomposition, we estimate the position of each band, the Lebesgue measure of the magnetic Laplacian spectrum and a variation of the spectrum under a perturbation by a magnetic field in terms of these invariants and minimal forms. In addition, we consider an inverse problem: we determine necessary and sufficient conditions for matrices depending on the quasimomentum on a finite graph to be fiber magnetic Laplacians. Moreover, similar results for magnetic Schr\"odinger operators with periodic potentials are obtained.