Minimum co-degree condition for perfect matchings in k-partite k-graphs

Abstract

Let H be a k-partite k-graph with n vertices in each partition class, and let δk-1(H) denote the minimum co-degree of H. We characterize those H with δk-1(H) ≥ n/2 and with no perfect matching. As a consequence we give an affirmative answer to the following question of R\"odl and Ruci\'nski: If k is even or n 2 4, does δk-1(H) ≥ n/2 imply that H has a perfect matching? We also give an example indicating that it is not sufficient to impose this degree bound on only two types of (k-1)-sets.