均匀超图完美匹配的精确最小度阈值

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"这篇论文‘Exact Minimum Degree Thresholds for Perfect Matchings in Uniform Hypergraphs (2012)’发表在《组合论理论，系列A》2012年119期，作者是Andrew Treglown和Yi Zhao。文章探讨了在均匀超图中完美匹配的精确最小度阈值问题，主要关注的是当4能整除k且k/2≤ℓ≤k-1时，如何给出一个确保存在完美匹配的最小度条件。这一条件被认为是最佳的，并且改进了Pikhurko之前关于完美匹配渐近精确结果的工作。作者们的方法利用了吸收方法、超图删除引理以及Keevash和Sudakov关于扩增三角形的图论泰然数的结构结果。" 在计算机科学，特别是图论和组合优化领域，完美匹配是一个重要的概念。完美匹配是指在一个图中，每个顶点恰好被一条边覆盖，而没有多余的边或未被覆盖的顶点。在超图中，这个概念被扩展到了更高维度的结构，即超边可以连接多个节点。均匀超图是指所有超边都包含相同数量节点的超图。文章的核心贡献在于给出了一个最小度阈值，当每个节点的度数至少达到这个阈值时，就能保证该均匀超图存在完美匹配。这里的“度”指的是一个节点参与的超边的数量。这个结果对于理解超图的结构特性以及在算法设计中的应用有着重要意义，特别是在那些需要寻找或保证存在完美匹配的问题中。作者使用了吸收方法，这是一种在图论中处理完美匹配问题的策略，通过找到一部分可以“吸收”其他剩余部分的结构，以确保整个图可以形成完美匹配。同时，他们也利用了超图删除引理，这是一个强大的工具，能够证明在满足某些条件的图中删除少数边后可以消除特定的子图结构。此外，Keevash和Sudakov关于扩增三角形的泰然数的结构结果也是他们论证过程中的关键，这涉及到图的密度和不包含特定子图的最大图的数量。这项工作不仅在理论上提供了新的洞察，而且对实际应用也有深远的影响，比如在设计高效算法解决匹配问题、网络路由规划、分配问题等。通过理解这些精确的度阈值，我们可以更好地预测和控制复杂系统中资源分配的有效性，这对于计算机科学和相关领域的研究具有重要价值。

1504 A. Treglown, Y. Zhao / Journal of Combinatorial Theory, Series A 119 (2012) 1500–1522

2.4. Two structural results for hypergraphs

In Section 5.3 we will show that if our hypergraph

does not contain a certain type of absorbing

set then

is in the extremal case. To deduce this, we will obtain structural information about two

auxiliary (hyper)graphs. This will in turn provide structural information about

. The following two

powerful results will be required for this.

Theorem 2.3 (Hypergraph Removal Lemma). (See [7,23].) Let

γ > 0 and k, t ∈ N such that 2  k  t. Given

any k-uniform hypergraph F on t vertices, there exists

α = α(F , γ )>0 and n

(F , γ ) ∈ N such that the

following holds. Suppose H is a k-uniform hypergraph on n

 n

vertices such that H contains at most αn

copies of F . Then H can be made F -free by deleting at most γ n

edges.

Given

∈ N,letC

denote the expanded 2

-uniform triangle. That is, C

consists of three disjoint

sets

of vertices of size

, and the edges

∪P

. Keevash and Sudakov [10]

used the following theorem to prove a conjecture of Frankl [5] concerning the Turán number of

Theorem 2.4. (See [10].) For every

γ > 0 and r ∈ N , there exists β = β(γ , r)>0 such that if H is a C

-free

r-uniform hypergraph on n vertices with

e(H)>



−β





then H = B

n,2

±γ n

3. Proof of Theorem 1.1

Most of the paper is devoted to the proof of the following two results: we will prove Theorem 3.1

in Section 5 and Theorem 3.2 in Section 4.

Theorem 3.1. Let

ε > 0 and r, ∈ N such that 2r    4r − 1. Then there exist α,ξ >0 and n

∈ N such

that the following holds. Suppose that H is a 4r-uniform hypergraph on n

 n

vertices where 4r divides n. If



(H) 



−α



n − 

4r −



then H is ε-close to B

n,4

or B

n,4

, or H contains a matching M of size |M|  ξn/(4r) that absorbs any set

⊆ V (H) \ V (M) such that |W |∈4rN with |W |  ξ

Notice that the minimum

-degree condition in Theorem 3.1 is weaker than that in Theorem 1.1.

Theorem 3.1 says that either H contains a reasonably small absorbing set which can absorb any small

set of vertices or H is ‘close’ to B

n,4r

or B

n,4r

. The next result shows that in the latter, ‘extremal case’,

H contains a perfect matching.

Theorem 3.2. Given 1

   k −1,thereexistε > 0 and n

∈ N such that the following holds. Suppose that H

is a k-uniform hypergraph on n

 n

vertices such that n is divisible by k. If δ



(H)>δ(n, k,)and H is ε-close

n,k

or B

n,k

, then H contains a perfect matching.

The following result of Markström and Ruci

nski [17] is needed in the ‘non-extremal’ case.

Theorem 3.3. (See [17, Lemma 2].) For each integer k

 3,every1    k − 2 and every γ > 0 there exists

an n

∈ N such that the following holds. Suppose that H is a k-uniform hypergraph on n  n

vertices such

that

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