Upper tails for irregular graphs beyond the mean-field regime

Abstract

Let Gn,p be the binomial random graph of density p and let XH be the number of copies of a fixed graph H in Gn,p. We prove asymptotically tight bounds on the logarithmic upper-tail probability of XH whenever H is a connected, irregular graph with maximum degree Δ 2 and p n-1/Δ- H ( n)ω(1) for an explicit H >0. These bounds are expressed in terms of a new variational problem that generalises the combinatorial optimisation problem arising from the naïve mean-field approximation. This new variational problem includes an entropy term that corresponds to the large number of embeddings of certain highly structured graphs in Kn. For a certain class of irregular graphs H that we call stable, we show that this description of the upper-tail probability is valid in a range of densities that is optimal up to a poly( n) factor. For a further subclass of stable graphs, which includes all irregular complete bipartite graphs, we show that this range of densities is optimal up to a multiplicative constant.