Some remarks on the extremal function for uniformly two-path dense hypergraphs

Abstract

We investigate extremal problems for hypergraphs satisfying the following density condition. A 3-uniform hypergraph H=(V, E) is (d, η,P2)-dense if for any two subsets of pairs P, Q⊂eq V× V the number of pairs ((x,y),(x,z))∈ P× Q with \x,y,z\∈ E is at least d|KP2(P,Q)|-η|V|3, where KP2(P,Q) denotes the set of pairs in P× Q of the form ((x,y),(x,z)). For a given 3-uniform hypergraph F we are interested in the infimum d≥ 0 such that for sufficiently small η every sufficiently large (d, η,P2)-dense hypergraph H contains a copy of F and this infimum will be denoted by πP2(F). We present a few results for the case when F=Kk(3) is a complete three uniform hypergraph on k vertices. It will be shown that πP2(K2r(3))≤ r-2r-1, which is sharp for r=2,3,4, where the lower bound for r=4 is based on a result of Chung and Graham [Edge-colored complete graphs with precisely colored subgraphs, Combinatorica 3 (3-4), 315-324].