Upper Tail For Homomorphism Counts In Constrained Sparse Random Graphs

Abstract

Consider the upper tail probability that the homomorphism count of a fixed graph H within a large sparse random graph Gn exceeds its expected value by a fixed factor 1+δ. Going beyond the Erdos-R\'enyi model, we establish here explicit, sharp upper tail decay rates for sparse random dn-regular graphs (provided H has a regular 2-core), and for sparse uniform random graphs. We further deal with joint upper tail probabilities for homomorphism counts of multiple graphs H1,…, Hk (extending the known results for k=1), and for inhomogeneous graph ensembles (such as the stochastic block model), we bound the upper tail probability by a variational problem analogous to the one that determines its decay rate in the case of sparse Erdos-R\'enyi graphs.