Counting independent sets in triangle-free graphs

Abstract

Ajtai, Koml\'os, and Szemer\'edi proved that for sufficiently large t every triangle-free graph with n vertices and average degree t has an independent set of size at least n100tt. We extend this by proving that the number of independent sets in such a graph is at least \[ 2(1/2400)nt2t. \] This result is sharp for infinitely many t,n apart from the constant. An easy consequence of our result is that there exists c'>0 such that every n-vertex triangle-free graph has at least \[ 2c' n n \] independent sets. We conjecture that the exponent above can be improved to n(n)3/2. This would be sharp by the celebrated result of Kim which shows that the Ramsey number R(3,k) has order of magnitude k2/ k.