Most probably trangle-free graphs

Abstract

The celebrated Mantel's theorem states that any triangle-free graph on n vertices contains at most n2/4 edges. It is natural to ask how many triangles must exist in a graph with more than n2/4 edges--a problem known as the Erdos-Rademacher problem. In this paper, we propose a probabilistic variant of this classic problem. Specifically, given an n-vertex graph G with n2/4+i (i>0) edges, we choose the edges of G independently with probability p, and the resulting new graph is triangle-free with a certain probability. Our goal is to maximize this probability by choosing G appropriately. For the case where G has n2/4 +1 edges, we determine the exact maximum probability.