Factors in random graphs

Abstract

Let H be a fixed graph on v vertices. For an n-vertex graph G with n divisible by v, an H- factor of G is a collection of n/v copies of H whose vertex sets partition V(G). In this paper we consider the threshold thH (n) of the property that an Erdos-R\'enyi random graph (on n points) contains an H-factor. Our results determine thH (n) for all strictly balanced H. The method here extends with no difficulty to hypergraphs. As a corollary, we obtain the threshold for a perfect matching in random k-uniform hypergraph, solving the well-known "Shamir's problem."