Perfect matchings in random sparsifications of Dirac hypergraphs

Abstract

For all integers n ≥ k > d ≥ 1, let md(k,n) be the minimum integer D ≥ 0 such that every k-uniform n-vertex hypergraph H with minimum d-degree δd( H) at least D has an optimal matching. For every fixed integer k ≥ 3, we show that for n ∈ k N and p = (n-k+1 n), if H is an n-vertex k-uniform hypergraph with δk-1( H) ≥ mk-1(k,n), then a.a.s.\ its p-random subhypergraph Hp contains a perfect matching. Moreover, for every fixed integer d < k and γ > 0, we show that the same conclusion holds if H is an n-vertex k-uniform hypergraph with δd( H) ≥ md(k,n) + γn - dk - d. Both of these results strengthen Johansson, Kahn, and Vu's seminal solution to Shamir's problem and can be viewed as ``robust'' versions of hypergraph Dirac-type results. In addition, we also show that in both cases above, H has at least ((1-1/k)n n - (n)) many perfect matchings, which is best possible up to an ((n)) factor.

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