The Ramsey number of generalized loose paths in uniform Hypergrpahs

Abstract

Let H=(V,E) be an r-uniform hypergraph. For each 1 ≤ s ≤ r-1, an s-path Pr,sn of length n in H is a sequence of distinct vertices v1,v2,…,vs+n(r-s) such that \v1+i(r-s),…, vs+(i+1)(r-s)\∈ E(H) for each 0 ≤ i ≤ n-1.Recently, the Ramsey number of 1-paths in uniform hypergraphs has received a lot of attention. In this paper, we consider the Ramsey number of r/2-paths for even r. Namely, we prove the following exact result: R( Pr,r/2n, Pr,r/23)=R( Pr,r/2n, Pr,r/24)=(n+1)r2+1.