Self-avoiding walk on nonunimodular transitive graphs
Abstract
We study self-avoiding walk on graphs whose automorphism group has a transitive nonunimodular subgroup. We prove that self-avoiding walk is ballistic, that the bubble diagram converges at criticality, and that the critical two-point function decays exponentially in the distance from the origin. This implies that the critical exponent governing the susceptibility takes its mean-field value, and hence that the number of self-avoiding walks of length is comparable to the th power of the connective constant. We also prove that the same results hold for a large class of repulsive walk models with a self-intersection based interaction, including the weakly self-avoiding walk. All these results apply in particular to the product of a -regular tree () with , for which these results were previously only known for large .
Keywords
Cite
@article{arxiv.1709.10515,
title = {Self-avoiding walk on nonunimodular transitive graphs},
author = {Tom Hutchcroft},
journal= {arXiv preprint arXiv:1709.10515},
year = {2018}
}
Comments
28 pages, 1 figure. V2: Minor revisions. To appear in Annals of Probability