On the cover Tur\'an number of Berge hypergraphs

Abstract

For a fixed set of positive integers R, we say H is an R-uniform hypergraph, or R-graph, if the cardinality of each edge belongs to R. For a graph G=(V,E), a hypergraph H is called a Berge-G, denoted by BG, if there exists a bijection f: E(G) E(H) such that for every e ∈ E(G), e ⊂eq f(e). In this paper, we define a variant of Tur\'an number in hypergraphs, namely the cover Tur\'an number, denoted as exR(n, G), as the maximum number of edges in the shadow graph of a Berge-G free R-graph on n vertices. We show a general upper bound on the cover Tur\'an number of graphs and determine the cover Tur\'an density of all graphs when the uniformity of the host hypergraph equals to 3.