Berge Pancyclic hypergraphs

Abstract

A Berge cycle of length in a hypergraph is an alternating sequence of distinct vertices and distinct edges v1,e1,v2, …, v, e such that \vi, vi+1\ ⊂eq ei for all i, with indices taken modulo . We call an n-vertex hypergraph pancyclic if it contains Berge cycles of every length from 3 to n. We prove a sharp Dirac-type result guaranteeing pancyclicity in uniform hypergraphs: for n ≥ 70, 3 ≤ r ≤ (n-1)/2 - 2, if is an n-vertex, r-uniform hypergraph with minimum degree at least (n-1)/2 r-1 + 1, then is pancyclic.

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