Minimum degree k and k-connectedness usually arrive together

Abstract

Let d,n∈ N be such that d=ω(1), and d n1-a for some constant a>0. Consider a d-regular graph G=(V, E) and the random graph process that starts with the empty graph G(0) and at each step G(i) is obtained from G(i-1) by adding uniformly at random a new edge from E. We show that if G satisfies some (very) mild global edge-expansion, and an almost optimal edge-expansion of sets up to order O(d n), then for any constant k∈ N in the random graph process on G, typically the hitting times of minimum degree at least k and of k-connectedness are equal. This, in particular, covers both d-regular high dimensional product graphs and pseudo-random graphs, and confirms a conjecture of Joos from 2015. We further demonstrate that this result is tight in the sense that there are d-regular n-vertex graphs with optimal edge-expansion of sets up to order (d), for which the probability threshold of minimum degree at least one is different than the probability threshold of connectivity.