Counting strongly connected (k1,k2)-directed cores

Abstract

Consider the set of all digraphs on [N] with M edges, whose minimum in-degree and minimum out-degree are at least k1 and k2 respectively. For k:=\k1,k2\ 2 and M/N>\k1,k2\, M=(N), we show that, among those digraphs, the fraction of k-strongly connected digraphs is 1-O(N-(k-1)). Earlier with Dan Poole we identified a sharp edge-density threshold c*(k1,k2) for birth of a giant (k1,k2)-core in the random digraph D(n,m=[cn]). Combining the claims, for c>c*(k1,k2) with probability 1-O(N-(k-1)) the giant (k1,k2)-core exists and is k-strongly connected.