Minimum degree thresholds for Hamilton (,k-)-cycles in k-uniform hypergraphs

Abstract

Let n>k> be positive integers. We say a k-uniform hypergraph H contains a Hamilton (,k-)-cycle if there is a partition (L0,R0,L1,R1,…,Lt-1,Rt-1) of V(H) with |Li|=, |Ri|=k- such that Li Ri and Ri Li+1 (subscripts module t) are all edges of H for i=0,1,…,t-1. In the present paper, we determine the tight minimum -degree condition that guarantees the existence of a Hamilton (,k-)-cycle in every k-uniform n-vertex hypergraph for k≥ 7, k/2≤ ≤ k-1 and sufficiently large n∈ kN.