Rainbow matchings for 3-uniform hypergraphs

Abstract

K\"uhn, Osthus, and Treglown and, independently, Khan proved that if H is a 3-uniform hypergraph with n vertices such that n∈ 3Z and large, and δ1(H)>n-1 2-2n/3 2, then H contains a perfect matching. In this paper, we show that for n∈ 3Z sufficiently large, if F1, …, Fn/3 are 3-uniform hypergrapghs with a common vertex set and δ1(Fi)>n-1 2-2n/3 2 for i∈ [n/3], then \F1,…, Fn/3\ admits a rainbow matching, i.e., a matching consisting of one edge from each Fi. This is done by converting the rainbow matching problem to a perfect matching problem in a special class of uniform hypergraphs.