When does the K4-free process stop?

Abstract

The K4-free process starts with the empty graph on n vertices and at each step adds a new edge chosen uniformly at random from all remaining edges that do not complete a copy of K4. Let G be the random maximal K4-free graph obtained at the end of the process. We show that for some positive constant C, with high probability as n ∞, the maximum degree in G is at most C n3/5[5] n. This resolves a conjecture of Bohman and Keevash for the K4-free process and improves on previous bounds obtained by Bollob\'as and Riordan and by Osthus and Taraz. Combined with results of Bohman and Keevash this shows that with high probability G has (n8/5[5] n) edges and is `nearly regular', i.e., every vertex has degree (n3/5[5] n). This answers a question of Erdos, Suen and Winkler for the K4-free process. We furthermore deduce an additional structural property: we show that whp the independence number of G is at least (n2/5( n)4/5/ n), which matches an upper bound obtained by Bohman up to a factor of ( n). Our analysis of the K4-free process also yields a new result in Ramsey theory: for a special case of a well-studied function introduced by Erdos and Rogers we slightly improve the best known upper bound.