Counting partitions of Gn,1/2 with degree congruence conditions

Abstract

For G=Gn, 1/2, the Erdos--Renyi random graph, let Xn be the random variable representing the number of distinct partitions of V(G) into sets A1, …, Aq so that the degree of each vertex in G[Ai] is divisible by q for all i∈[q]. We prove that if q≥ 3 is odd then XndPo(1/q!), and if q ≥ 4 is even then XndPo(2q/q!). More generally, we show that the distribution is still asymptotically Poisson when we require all degrees in G[Ai] to be congruent to xi modulo q for each i∈[q], where the residues xi may be chosen freely. For q=2, the distribution is not asymptotically Poisson, but it can be determined explicitly.