The typical structure of dense claw-free graphs

Abstract

We analyze the asymptotic number and typical structure of claw-free graphs at constant edge densities. The first of our main results is a formula for the asymptotics of the logarithm of the number of claw-free graphs of edge density γ ∈ (0,1). We show that the problem exhibits a second-order phase transition at edge density γ=5-54. The asymptotic formula arises by solving a variational problem over graphons. For γ≥γ there is a unique optimal graphon, while for γ<γ there is an infinite set of optimal graphons. By analyzing more detailed structure, we prove that for γ<γ, there is in fact a unique graphon W such that almost all claw-free graphs at edge density γ are close in cut metric to W. We also analyze the probability of claw-freeness in the Erdos-R\'enyi random graph G(n,p) for constant p, obtaining a formula for the large-deviation rate function for claw-freeness. In this case, the problem exhibits a first-order phase transition at p=3-52, separating distinct structural regimes. At the critical point p, the corresponding graphon variational problem has infinitely many solutions, and we again pinpoint a unique optimal graphon that describes the typical structure of G(n,p) conditioned on being claw-free.