Perfect graphs of fixed density: counting and homogenous sets

Abstract

For c in [0,1] let Pn(c) denote the set of n-vertex perfect graphs with density c and Cn(c) the set of n-vertex graphs without induced C5 and with density c. We show that log|Pn(c)|/binomn2=log|Cn(c)|/binomn2=h(c)+o(1) with h(c)=1/2 if 1/4<c<3/4 and h(c)=H(|2c-1|)/2 otherwise, where H is the binary entropy function. Further, we use this result to deduce that almost all graphs in Cn(c) have homogenous sets of linear size. This answers a question raised by Loebl, Reed, Scott, Thomason, and Thomass\'e [Almost all H-free graphs have the Erdos-Hajnal property] in the case of forbidden induced C5.