Forbidding matching as trace in uniform hypergraphs

Abstract

We say a hypergraph H contains a hypergraph G as trace if there exists a vertex subset S ⊂eq V(H) such that |S| = |V(G)| and \e S: e ∈ E(H)\ contains G as a sub-hypergraph. We use exr(n, Trr(G)) to denote the maximum number of hyperedges in an r-uniform hypergraph on n vertices not containing G as a trace. The study of Tur\'an numbers for traces was initiated by Mubayi and Zhao who studied the case when G is a complete graph. Let Ms+1 denote the graph of a matching with s+1 edges. In this paper, we give the upper bound of exr(n, Trr(Ms+1)) which is sharp asymptotically. When r=3, we give the exact value of ex3 (n, Tr3 (Ms+1)). We also consider the generalized Tur\'an number in the case of matching. That is, the maximum number of copies of clique Ktr in hypergraphs forbidding Trr (Ms+1) as a trace. We give an upper bound which is sharp asymptotically and when r=3, we give the exact value. The Tur\'an number of forbidding a matching and the other graph is another well studied topic initiated by Alon and Frankl. We also consider an analogue problem for the trace version, i.e., forbidding trace of matching and trace of complete graph as subgraphs.