Dong Yeap Kang, Tom Kelly, Daniela Kühn, Deryk Osthus, Vincent Pfenninger
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Moreover, for every fixed integer <span>\\(d < k\\)</span> and <span>\\(\\gamma > 0\\)</span>, we show that the same conclusion holds if <span>\\({\\mathcal {H}}\\)</span> is an <i>n</i>-vertex <i>k</i>-uniform hypergraph with <span>\\(\\delta _d({\\mathcal {H}}) \\ge m_{d}(k,n) + \\gamma \\left( {\\begin{array}{c}n - d\\\\ k - d\\end{array}}\\right) \\)</span>. 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, <span>\\({\\mathcal {H}}\\)</span> has at least <span>\\(\\exp ((1-1/k)n \\log n - \\Theta (n))\\)</span> many perfect matchings, which is best possible up to an <span>\\(\\exp (\\Theta (n))\\)</span> factor.</p>","PeriodicalId":50666,"journal":{"name":"Combinatorica","volume":"3 1","pages":""},"PeriodicalIF":1.0000,"publicationDate":"2024-08-05","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"Perfect Matchings in Random Sparsifications of Dirac Hypergraphs\",\"authors\":\"Dong Yeap Kang, Tom Kelly, Daniela Kühn, Deryk Osthus, Vincent Pfenninger\",\"doi\":\"10.1007/s00493-024-00116-0\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"<p>For all integers <span>\\\\(n \\\\ge k > d \\\\ge 1\\\\)</span>, let <span>\\\\(m_{d}(k,n)\\\\)</span> be the minimum integer <span>\\\\(D \\\\ge 0\\\\)</span> such that every <i>k</i>-uniform <i>n</i>-vertex hypergraph <span>\\\\({\\\\mathcal {H}}\\\\)</span> with minimum <i>d</i>-degree <span>\\\\(\\\\delta _{d}({\\\\mathcal {H}})\\\\)</span> at least <i>D</i> has an optimal matching. For every fixed integer <span>\\\\(k \\\\ge 3\\\\)</span>, we show that for <span>\\\\(n \\\\in k \\\\mathbb {N}\\\\)</span> and <span>\\\\(p = \\\\Omega (n^{-k+1} \\\\log n)\\\\)</span>, if <span>\\\\({\\\\mathcal {H}}\\\\)</span> is an <i>n</i>-vertex <i>k</i>-uniform hypergraph with <span>\\\\(\\\\delta _{k-1}({\\\\mathcal {H}}) \\\\ge m_{k-1}(k,n)\\\\)</span>, then a.a.s. its <i>p</i>-random subhypergraph <span>\\\\({\\\\mathcal {H}}_p\\\\)</span> contains a perfect matching. Moreover, for every fixed integer <span>\\\\(d < k\\\\)</span> and <span>\\\\(\\\\gamma > 0\\\\)</span>, we show that the same conclusion holds if <span>\\\\({\\\\mathcal {H}}\\\\)</span> is an <i>n</i>-vertex <i>k</i>-uniform hypergraph with <span>\\\\(\\\\delta _d({\\\\mathcal {H}}) \\\\ge m_{d}(k,n) + \\\\gamma \\\\left( {\\\\begin{array}{c}n - d\\\\\\\\ k - d\\\\end{array}}\\\\right) \\\\)</span>. 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引用次数: 0
摘要
对于所有整数(n \ge k > d \ge 1\),让(m_{d}(k,n)\)是最小整数(D \ge 0\),使得最小d度(\delta _{d}({\mathcal{H}}))至少为D的每一个k-uniform n-vertex超图({\mathcal {H}})都有一个最优匹配。对于每一个固定整数(kge 3),我们证明对于(n \in k \mathbb {N})和(p = \Omega (n^{-k+1} \log n))、if \({\mathcal {H}}\) is an n-vertex k-uniform hypergraph with \(\delta _{k-1}({\mathcal {H}}) \ge m_{k-1}(k,n)\), then a.s. 它的 p 随机子跨图 \({\mathcal {H}}_p\) 包含一个完美匹配。此外,对于每一个固定整数 \(d < k\) 和 \(\gamma >;0),我们证明如果 \({\mathcal {H}}\) 是一个 n 个顶点的 k-uniform 超图,并且 \(\delta _d({/mathcal {H}}) \ge m_{d}(k,n) + \gamma \left( {\begin{array}{c}n - d\ k - d\end{array}}\right) \),那么同样的结论也成立。这两个结果都加强了约翰森、卡恩和武对沙米尔问题的开创性解决,可以看作是超图狄拉克型结果的 "健壮 "版本。此外,我们还证明了在上述两种情况下,({mathcal {H}}\)至少有\(\exp ((1-1/k)n \log n - \Theta (n))\)个完美匹配,这是最好的可能,直到一个\(\exp (\Theta (n))\)因子。
Perfect Matchings in Random Sparsifications of Dirac Hypergraphs
For all integers \(n \ge k > d \ge 1\), let \(m_{d}(k,n)\) be the minimum integer \(D \ge 0\) such that every k-uniform n-vertex hypergraph \({\mathcal {H}}\) with minimum d-degree \(\delta _{d}({\mathcal {H}})\) at least D has an optimal matching. For every fixed integer \(k \ge 3\), we show that for \(n \in k \mathbb {N}\) and \(p = \Omega (n^{-k+1} \log n)\), if \({\mathcal {H}}\) is an n-vertex k-uniform hypergraph with \(\delta _{k-1}({\mathcal {H}}) \ge m_{k-1}(k,n)\), then a.a.s. its p-random subhypergraph \({\mathcal {H}}_p\) contains a perfect matching. Moreover, for every fixed integer \(d < k\) and \(\gamma > 0\), we show that the same conclusion holds if \({\mathcal {H}}\) is an n-vertex k-uniform hypergraph with \(\delta _d({\mathcal {H}}) \ge m_{d}(k,n) + \gamma \left( {\begin{array}{c}n - d\\ k - d\end{array}}\right) \). 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, \({\mathcal {H}}\) has at least \(\exp ((1-1/k)n \log n - \Theta (n))\) many perfect matchings, which is best possible up to an \(\exp (\Theta (n))\) factor.
期刊介绍:
COMBINATORICA publishes research papers in English in a variety of areas of combinatorics and the theory of computing, with particular emphasis on general techniques and unifying principles. Typical but not exclusive topics covered by COMBINATORICA are
- Combinatorial structures (graphs, hypergraphs, matroids, designs, permutation groups).
- Combinatorial optimization.
- Combinatorial aspects of geometry and number theory.
- Algorithms in combinatorics and related fields.
- Computational complexity theory.
- Randomization and explicit construction in combinatorics and algorithms.