Ramsey Numbers for Non-trivial Berge Cycles

Abstract

In this paper, we consider an extension of cycle-complete graph Ramsey numbers to Berge cycles in hypergraphs: for k ≥ 2, a non-trivial Berge k-cycle is a family of sets e1,e2,…,ek such that e1 e2, e2 e3,…,ek e1 has a system of distinct representatives and e1 e2 … ek = . In the case that all the sets ei have size three, let Bk denotes the family of all non-trivial Berge k-cycles. The Ramsey numbers R(t,Bk) denote the minimum n such that every n-vertex 3-uniform hypergraph contains either a non-trivial Berge k-cycle or an independent set of size t. We prove \[ R(t, B2k) ≤ t1 + 12k-1 + 4 t\] and moreover, we show that if a conjecture of Erdos and Simonovits ES on girth in graphs is true, then this is tight up to a factor to(1) as t → ∞.