The voter model on random regular graphs with random rewiring
Abstract
We consider the voter model with binary opinions on a random regular graph with vertices of degree , subject to a rewiring dynamics in which pairs of edges are rewired, i.e., broken into four half-edges and subsequently reconnected at random. A parameter regulates the frequency at which the rewirings take place, in such a way that any given edge is rewired exponentially at a rate in the limit as . We show that, under the joint law of the random rewiring dynamics and the random opinion dynamics, the fraction of vertices with either one of the two opinions converges on time scale to the Fisher-Wright diffusion with an explicit diffusion constant in the limit as . In particular, we identify in terms of a continued-fraction expansion and analyse its dependence on and . A key role in our analysis is played by the set of discordant edges, which constitutes the boundary between the sets of vertices carrying the two opinions.
Keywords
Cite
@article{arxiv.2501.08703,
title = {The voter model on random regular graphs with random rewiring},
author = {Luca Avena and Rangel Baldasso and Rajat Subhra Hazra and Frank den Hollander and Matteo Quattropani},
journal= {arXiv preprint arXiv:2501.08703},
year = {2025}
}
Comments
53 pages