Tur\'an numbers for Berge-hypergraphs and related extremal problems

Abstract

Let F be a graph. We say that a hypergraph H is a Berge-F if there is a bijection f : E(F) → E(H ) such that e ⊂eq f(e) for every e ∈ E(F). Note that Berge-F actually denotes a class of hypergraphs. The maximum number of edges in an n-vertex r-graph with no subhypergraph isomorphic to any Berge-F is denoted r(n,Berge-F). In this paper we establish new upper and lower bounds on r(n,Berge-F) for general graphs F, and investigate connections between r(n,Berge-F) and other recently studied extremal functions for graphs and hypergraphs. One case of specific interest will be when F = Ks,t. Additionally, we prove a counting result for r-graphs of girth five that complements the asymptotic formula ex3 (n , Berge-\ C2 , C3 , C4 \ ) = 16 n3/2 + o( n3/2 ) of Lazebnik and Verstra\"ete [ Electron.\ J. of Combin. 10, (2003)].