Square percolation and the threshold for quadratic divergence in random right-angled Coxeter groups

Abstract

Given a graph , its auxiliary square-graph () is the graph whose vertices are the non-edges of and whose edges are the pairs of non-edges which induce a square (i.e., a 4-cycle) in . We determine the threshold edge-probability p=pc(n) at which the Erd os--R\'enyi random graph =n,p begins to asymptotically almost surely have a square-graph with a connected component whose squares together cover all the vertices of n,p. We show pc(n)=6-2/n, a polylogarithmic improvement on earlier bounds on pc(n) due to Hagen and the authors. As a corollary, we determine the threshold p=pc(n) at which the random right-angled Coxeter group W_n,p asymptotically almost surely becomes strongly algebraically thick of order 1 and has quadratic divergence.