Matchings in k-partite k-uniform Hypergraphs

Abstract

For k 3 and ε>0, let H be a k-partite k-graph with parts V1,…, Vk each of size n, where n is sufficiently large. Assume that for each i∈ [k], every (k-1)-set in Πj∈ [k] \i\ Vi lies in at least ai edges, and a1 a2 ·s ak. We show that if a1, a2 ε n, then H contains a matching of size \n-1, Σi∈ [k]ai\. In particular, H contains a matching of size n-1 if each crossing (k-1)-set lies in at least n/k edges, or each crossing (k-1)-set lies in at least n/k edges and n 1 k. This special case answers a question of R\"odl and Ruci\'nski and was independently obtained by Lu, Wang, and Yu. The proof of Lu, Wang, and Yu closely follows the approach of Han [Combin. Probab. Comput. 24 (2015), 723--732] by using the absorbing method and considering an extremal case. In contrast, our result is more general and its proof is thus more involved: it uses a more complex absorbing method and deals with two extremal cases.