A Note on Minimum Degree Condition for Hamiltonian (a,b)-Cycles in Hypergraphs
Abstract
Let k,a,b be positive integers with a+b=k. A k-uniform hypergraph is called an (a,b)-cycle if there is a partition (A0,B0,A1,B1,…,At-1,Bt-1) of the vertex set with |Ai|=a, |Bi|=b such that Ai Bi and Bi Ai+1 (subscripts module t) are edges for all i=0,1,…,t-1. Let H be a k-uniform n-vertex hypergraph with n≥ 5k and n divisible by k. By applying the concentration inequality for intersections of a uniform hypergraph with a random matching developed by Frankl and Kupavskii, we show that if there exists α∈ (0,1) such that δa(H)≥ (α +o(1))n-ab and δb(H)≥ (1-α +o(1))n-ba, then H contains a Hamilton (a,b)-cycle. As a corollary, we prove that if δ(H)≥ (1/2 +o(1))n-k- for some ≥ k/2, then H contains a Hamilton (k-,)-cycle and this is asymptotically best possible.
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