An Ore-type theorem for [3]-graphs

Abstract

Ore's Theorem states that if G is an n-vertex graph and every pair of non-adjacent vertices has degree sum at least n, then G is Hamiltonian. A [3]-graph is a hypergraph in which every edge contains at most 3 vertices. In this paper, we prove an Ore-type result on the existence of Hamiltonian Berge cycles in [3]-graph , based on the degree sum of every pair of non-adjacent vertices in the 2-shadow graph ∂ of . Namely, we prove that there exists a constant d0 such that for all n ≥ 6, if a [3]-graph on n vertices satisfies that every pair u,v ∈ V() of non-adjacent vertices has degree sum d∂ (u) + d∂ (v) ≥ n+d0, then contains a Hamiltonian Berge cycle. Moreover, we conjecture that d0=1 suffices.