Tur\'an Problems for Vertex-disjoint Cliques in Multi-partite Hypergraphs

Abstract

For two s-uniform hypergraphs H and F, the Tur\'an number exs(H,F) is the maximum number of edges in an F-free subgraph of H. Let s, r, k, n1, …, nr be integers satisfying 2≤ s≤ r and n1≤ n2≤ ·s≤ nr. De Silva, Heysse and Young determined ex2(Kn1, …, nr, kK2) and De Silva, Heysse, Kapilow, Schenfisch and Young determined ex2(Kn1, …, nr,kKr). In this paper, as a generalization of these results, we consider three Tur\'an-type problems for k disjoint cliques in r-partite s-uniform hypergraphs. First, we consider a multi-partite version of the Erdos matching conjecture and determine exs(Kn1, …, nr(s),kKs(s)) for n1≥ s3k2+sr. Then, using a probabilistic argument, we determine exs(Kn1, …, nr(s),kKr(s)) for all n1≥ k. Recently, Alon and Shikhelman determined asymptotically, for all F, the generalized Tur\'an number ex2(Kn,Ks,F), which is the maximum number of copies of Ks in an F-free graph on n vertices. Here we determine ex2(Kn1, …, nr, Ks, kKr) with n1≥ k and n3=·s=nr. Utilizing a result on rainbow matchings due to Glebov, Sudakov and Szab\'o, we determine ex2(Kn1, …, nr, Ks, kKr) for all n1, …, nr with n4≥ rr(k-1)k2r-2.