Asymptotics for Shamir's Problem

Abstract

For fixed r≥ 3 and n divisible by r, let H= Hrn,M be the random M-edge r-graph on V=\1,… ,n\; that is, H is chosen uniformly from the M-subsets of K:=V r (:= \r-subsets of V\). Shamir's Problem (circa 1980) asks, roughly, for what M=M(n) is H likely to contain a perfect matching (that is, n/r disjoint r-sets)? In 2008 Johansson, Vu and the author showed that this is true for M>Crn n. The present paper has two purposes. First, it establishes the asymptotically correct version of the 2008 result: Theorem 1. For fixed ε>0 and M> (1+ε)(n/r) n, P( H ~contains a perfect matching)→ 1 as n→∞. Second, it begins a proof of the definitive ``hitting time" statement: Theorem 2. If A1, … ~ is a uniform permutation of K, Ht=\A1,… ,At\, and T=\t:A1 ·s At=V\, then P( HT ~contains a perfect matching)→ 1 as n→∞. It is shown here that Theorem 2 follows from a conditional version of Theorem 1 that will be proved elsewhere. The key ideas in that proof are similar to those for Theorem 1, but the argument is a longer story, and it has seemed best to give the present separate proof of Theorem 1, in which those ideas may appear more clearly.