Slightly subcritical hypercube percolation

Abstract

We study bond percolation on the hypercube \0,1\m in the slightly subcritical regime where p = pc (1-m) and m = o(1) but m 2-m/3 and study the clusters of largest volume and diameter. We establish that with high probability the largest component has cardinality (m-2 (m3 2m)), that the maximal diameter of all clusters is (1+o(1)) m-1 (m3 2m), and that the maximal mixing time of all clusters is (m-3 2(m3 2m)). These results hold in different levels of generality, and in particular, some of the estimates hold for various classes of graphs such as high-dimensional tori, expanders of high degree and girth, products of complete graphs, and infinite lattices in high dimensions.