Rapid phase ordering for Ising and Potts dynamics on random regular graphs
Abstract
We consider the Ising, and more generally, -state Potts Glauber dynamics on random -regular graphs on vertices at low temperatures . The mixing time is exponential in due to a bottleneck between dominant phases consisting of configurations in which the majority of vertices are in the same state. We prove that for any , from biased initializations with more vertices in state- than in other states, the Glauber dynamics quasi-equilibrates to the stationary distribution conditioned on having plurality in state- in optimal time. Moreover, the requisite initial bias can be taken to zero as . Even for the Ising case, where the states are naturally identified with , proving such a result requires a new approach in order to control negative information spread in spacetime despite the model being in low temperature and exhibiting strong local correlations. For this purpose, we introduce a coupled non-Markovian rigid dynamics for which a delicate temporal recursion on probability mass functions of minus spacetime cluster sizes establishes their subcriticality.
Keywords
Cite
@article{arxiv.2505.15783,
title = {Rapid phase ordering for Ising and Potts dynamics on random regular graphs},
author = {Reza Gheissari and Allan Sly and Youngtak Sohn},
journal= {arXiv preprint arXiv:2505.15783},
year = {2025}
}
Comments
41 pages, 2 figures