A hypergraph analog of Dirac's Theorem for long cycles in 2-connected graphs
Abstract
Dirac proved that each n-vertex 2-connected graph with minimum degree at least k contains a cycle of length at least \2k, n\. We consider a hypergraph version of this result. A Berge cycle in a hypergraph is an alternating sequence of distinct vertices and edges v1,e2,v2, …, ec, v1 such that \vi,vi+1\ ⊂eq ei for all i (with indices taken modulo c). We prove that for n ≥ k ≥ r+2 ≥ 5, every 2-connected r-uniform n-vertex hypergraph with minimum degree at least k-1 r-1 + 1 has a Berge cycle of length at least \2k, n\. The bound is exact for all k≥ r+2≥ 5.
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