Metastability of the Potts ferromagnet on random regular graphs

TL;DR

This paper investigates the metastability phenomena in the $q$-state ferromagnetic Potts model on random regular graphs, revealing phase coexistence and its impact on the mixing times of Markov chains like Glauber and Swendsen-Wang.

Contribution

It characterizes the emergence of metastable phases for all $q,d extgreater 2$ on regular graphs and links these phases to algorithmic mixing time bounds.

Findings

Identifies coexistence of phases in a temperature interval

Proves exponential mixing time bounds above the uniqueness threshold

Establishes slow mixing for the Swendsen-Wang chain across the metastable regime

Abstract

We study the performance of Markov chains for the $q$-state ferromagnetic Potts model on random regular graphs. It is conjectured that their performance is dictated by metastability phenomena, i.e., the presence of "phases" (clusters) in the sample space where Markov chains with local update rules, such as the Glauber dynamics, are bound to take exponential time to escape. The phases that are believed to drive these metastability phenomena in the case of the Potts model emerge as local, rather than global, maxima of the so-called Bethe functional, and previous approaches of analysing these phases based on optimisation arguments fall short of the task. Our first contribution is to detail the emergence of the metastable phases for the $q$-state Potts model on the $d$-regular random graph for all integers $q,d\geq 3$, and establish that for an interval of temperatures, which is delineated by the uniqueness and a broadcasting threshold on the $d$-regular tree, the two phases coexist. The proofs are based on a conceptual connection between spatial properties and the structure of the Potts distribution on the random regular graph, rather than complicated moment calculations. Based on this new structural understanding of the model, we obtain various algorithmic consequences. We first complement recent fast mixing results for Glauber dynamics by Blanca and Gheissari below the uniqueness threshold, showing an exponential lower bound on the mixing time above the uniqueness threshold. Then, we obtain tight results even for the non-local Swendsen-Wang chain, where we establish slow mixing/metastability for the whole interval of temperatures where the chain is conjectured to mix slowly on the random regular graph. The key is to bound the conductance of the chains using a random graph "planting" argument combined with delicate bounds on random-graph percolation.