Matching and intersection problems for non-trivial r-partite r-uniform hypergraphs

Abstract

A central theme in extremal combinatorics is the study of the maximum number of edges in an r-uniform hypergraph (r-graph) with matching number at most s (the Erdos Matching Conjecture) or with pairwise intersection at least t (the t-intersection problem). The maximum sizes for these problems are typically achieved by trivial constructions: for the matching problem, the extremal construction consists of all edges intersecting a fixed set of s vertices, while for the intersection problem, it consists of all edges containing a fixed set of t vertices. In this paper, we investigate the non-trivial r-partite r-graphs where each part is of size n. We determine the exact bounds for both the matching problem and the intersection problem when n is sufficiently large. Furthermore, for the intersection problem, we resolve the cases t=1 and t=r-2 for all n 2. Our results partially confirm a conjecture of Lu and Ma.