On the measure of spectra for discrete Schr\"odinger operators on periodic graphs

TL;DR

This paper analyzes the spectral measure of discrete Schrödinger operators on periodic graphs with large coupling, extending previous results from one-dimensional lattices to general periodic graphs.

Contribution

It provides an asymptotic upper bound for the spectrum measure depending on potential degeneracy, generalizing prior one-dimensional results to broader graph classes.

Findings

Derived an asymptotic upper bound for the spectrum measure at large coupling.

Extended previous one-dimensional lattice results to general periodic graphs.

Linked the spectrum measure behavior to potential degeneracy and recent spectral criteria.

Abstract

We consider discrete Schr\"odinger operators $H_{\mu Q}=\Delta+\mu Q$ with real periodic potentials $Q$ on periodic graphs, where $\Delta$ is the adjacency operator and $\mu\in\mathbb R$ is a coupling constant. The spectra of the operators consist of a finite number of closed intervals (bands). In the large coupling regime, we obtain an asymptotic upper bound for the measure of the spectrum of $H_{\mu Q}$ which depends essentially on a "degeneracy degree" of the potential $Q$. This result extends the result of Y. Last obtained for the one-dimensional lattice $\mathbb Z$ to the case of general periodic graphs. It also may serve as a certain quantitative complement to the recent criterion of J. Fillman for the measure of the spectrum of $H_{\mu Q}$ to go to zero as $\mu\to\infty$.