Spectral properties of unimodular lattice triangulations

TL;DR

This paper investigates the spectral properties of unimodular lattice triangulations, revealing how their spectra exhibit crossover behavior between ordered and disordered states, with implications for transport phenomena.

Contribution

It provides a detailed analysis of spectral properties of unimodular lattice triangulations, including analytical and numerical results, and explores their crossover behavior between different graph regimes.

Findings

Spectral properties follow power law dependencies on system size.

Qualitative agreement with known random graph models.

Crossover behavior in algebraic connectivity and spectral radius.

Abstract

Random unimodular lattice triangulations have been recently used as an embedded random graph model, which exhibit a crossover behaviour between an ordered, large-world and a disordered, small-world behaviour. Using the ergodic Pachner flips that transform such triangulations into another and an energy functional that corresponds to the degree distribution variance, Markov chain Monte-Carlo simulations can be applied to study these graphs. Here, we consider the spectra of the adja cency and the Laplacian matrix as well as the algebraic connectivity and the spectral radius. Power law dependencies on the system size can clearly be identified and compared to analytical solutions for periodic ground states. For random triangulations we find a qualitative agreement of the spectral properties with well-known random graph models. In the microcanonical ensemble analytical approximations agree with numerical simulations. In the canonical ensemble a crossover behaviour can be found for the algebraic connectivity and the spectral radius, thus combining large-world and small-world behavior in one model. The considered spectral properties can be applied to transport problems on triangulation graphs and the crossover behaviour allows a tuning of important transport quantities.