On rainbow matchings for hypergraphs

Abstract

For any posotive integer m, let [m]:=\1,…,m\. Let n,k,t be positive integers. Aharoni and Howard conjectured that if, for i∈ [t], Fi⊂[n]k:= \(a1,…,ak): aj∈ [n] for j∈ [k]\ and |Fi|>(t-1)nk-1, then there exist M⊂eq [n]k such that |M|=t and |M Fi|=1 for i∈ [t] We show that this conjecture holds when n≥ 3(k-1)(t-1). Let n, t, k1 k2≥ …≥ kt be positive integers. Huang, Loh and Sudakov asked for the maximum i=1t | Ri| over all R=\ R1, … , Rt\ such that each Ri is a collection of ki-subsets of [n] for which there does not exist a collection M of subsets of [n] such that |M|=t and |M Ri|=1 for i∈ [t] %and R does not admit a rainbow matching. We show that for sufficiently large n with Σi=1t ki≤ n(1-(4k n/n)1/k) , Πi=1t |Ri|≤ n-1 k1-1n-1 k2-1Πi=3tn ki. This bound is tight.