Non-isomorphic subgraphs in random graphs

Abstract

We establish the asymptotic behaviour of μ(G(n,p)), the number of unlabelled induced subgraphs in the binomial random graph G(n,p), for almost the entire range of the probability parameter p=p(n)∈[0,1]. In particular, we show that typically the number of subgraphs becomes exponential when p passes 1/n, reaches maximum possible base of exponent (asymptotically) when p 1/n, and reaches the asymptotic value 2n when p passes 2 n/n. For p n/n, we get the first order term and asymptotics of the second order term of μ(G(n,p)). We also prove that random regular graphs Gn,d typically have μ(Gn,d)≥ 2cd n for all d≥ 3 and some positive constant cd such that cd 1 as d∞.