Weakly saturated random graphs

Abstract

As introduced by Bollob\'as, a graph G is weakly H-saturated if the complete graph Kn is obtained by iteratively completing copies of H minus an edge. For all graphs H, we obtain an asymptotic lower bound for the critical threshold pc, at which point the Erdos--R\'enyi graph Gn,p is likely to be weakly H-saturated. We also prove an upper bound for pc, for all H which are, in a sense, strictly balanced. In particular, we improve the upper bound by Balogh, Bollob\'as and Morris for H=Kr, and we conjecture that this is sharp up to constants.