Extremal Subgraphs of Random Graphs: an Extended Version

Abstract

We prove that there is a constant c >0, such that whenever p n-c, with probability tending to 1 when n goes to infinity, every maximum triangle-free subgraph of the random graph Gn,p is bipartite. This answers a question of Babai, Simonovits and Spencer (Journal of Graph Theory, 1990). The proof is based on a tool of independent interest: we show, for instance, that the maximum cut of almost all graphs with M edges, where M >> n, is ``nearly unique''. More precisely, given a maximum cut C of Gn,M, we can obtain all maximum cuts by moving at most O(n3/M) vertices between the parts of C.