Birth of a giant (k1,k2)-core in the random digraph

Abstract

The (k1,k2)-core of a digraph is the largest sub-digraph with minimum in-degree and minimum out-degree at least k1 and k2 respectively. For \k1, k2\ ≥ 2, we establish existence of the threshold edge-density c*=c*(k1,k2), such that the random digraph D(n,m), on the vertex set [n] with m edges, asymptotically almost surely has a giant (k1,k2)-core if m/n> c*, and has no (k1,k2)-core if m/n<c*. Specifically, denoting P(Poisson(z) k) by pk(z), we prove that c*=z1,z2\z1pk1(z1)pk2-1(z2); z2pk1-1(z1)pk2(z2)\.