$L^2$-cutoff for the averaging process on random regular graphs
Probability
2026-03-03 v1
Abstract
We study the mixing time of the averaging process on a large random -regular graph, , and prove an -cutoff with an explicit cutoff time. Somewhat surprisingly, we uncover a phase transition at the finite, fixed degree : for small degrees, i.e., , the averaging process mixes as fast as the corresponding random walk on the same graph, whereas for its -mixing is governed by a different, slower mechanism. Our proof relies on a detailed asymptotic analysis of an auxiliary biased birth-and-death chain with a slow bond. We also briefly discuss an analogous phase transition for the -mixing.
Keywords
Cite
@article{arxiv.2603.00705,
title = {$L^2$-cutoff for the averaging process on random regular graphs},
author = {Pietro Caputo and Matteo Quattropani and Federico Sau},
journal= {arXiv preprint arXiv:2603.00705},
year = {2026}
}
Comments
16 pages, 3 figures