Positive codegree thresholds for perfect matchings in hypergraphs
Abstract
We give, for each k ≥ 3, the precise best possible minimum positive codegree condition for a perfect matching in a large k-uniform hypergraph H on n vertices. Specifically we show that, if n is sufficiently large and divisible by k, and H has minimum positive codegree δ+(H) ≥ k-1kn - (k-2) and no isolated vertices, then H contains a perfect matching. For k=3 this was previously established by Halfpap and Magnan, who also gave bounds for k ≥ 4 which were tight up to an additive constant.
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