Asymptotics for Tur\'an numbers of cycles in 3-uniform linear hypergraphs

Abstract

Let F be a family of 3-uniform linear hypergraphs. The linear Tur\'an number of F is the maximum possible number of edges in a 3-uniform linear hypergraph on n vertices which contains no member of F as a subhypergraph. In this paper we show that the linear Tur\'an number of the five cycle C5 (in the Berge sense) is 13 3n3/2 asymptotically. We also show that the linear Tur\'an number of the four cycle C4 and \C3, C4\ are equal asmptotically, which is a strengthening of a theorem of Lazebnik and Verstra\"ete. We establish a connection between the linear Tur\'an number of the linear cycle of length 2k+1 and the extremal number of edges in a graph of girth more than 2k-2. Combining our result and a theorem of Collier-Cartaino, Graber and Jiang, we obtain that the linear Tur\'an number of the linear cycle of length 2k+1 is (n1+1k) for k = 2, 3, 4, 6.