Notes on Equitable Partitions into Matching Forests in Mixed Graphs and into $b$-branchings in Digraphs

Discret. Math. Theor. Comput. Sci. Pub Date : 2020-03-24 DOI:10.46298/dmtcs.8719

Kenjiro Takazawa

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Abstract

An equitable partition into branchings in a digraph is a partition of the arc set into branchings such that the sizes of any two branchings differ at most by one. For a digraph whose arc set can be partitioned into $k$ branchings, there always exists an equitable partition into $k$ branchings. In this paper, we present two extensions of equitable partitions into branchings in digraphs: those into matching forests in mixed graphs; and into $b$-branchings in digraphs. For matching forests, Kir\'{a}ly and Yokoi (2022) considered a tricriteria equitability based on the sizes of the matching forest, and the matching and branching therein. In contrast to this, we introduce a single-criterion equitability based on the number of covered vertices, which is plausible in the light of the delta-matroid structure of matching forests. While the existence of this equitable partition can be derived from a lemma in Kir\'{a}ly and Yokoi, we present its direct and simpler proof. For $b$-branchings, we define an equitability notion based on the size of the $b$-branching and the indegrees of all vertices, and prove that an equitable partition always exists. We then derive the integer decomposition property of the associated polytopes.

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混合图中匹配森林的公平划分和有向图中$b$-分支的公平划分

在有向图中，一个合理的分支分割是将弧集分割成分支，使得任意两个分支的大小最多只相差一个。对于弧集可划分为$k$分支的有向图，总存在一个公平划分为$k$分支的有向图。本文给出了有向图中公平划分为分支的两种扩展:混合图中公平划分为匹配森林的扩展;并化成$b$-分支图。对于匹配森林，Kir\ {a}ly和Yokoi(2022)考虑了基于匹配森林的大小以及其中的匹配和分支的公平性标准。与此相反，我们引入了基于被覆盖顶点数量的单准则公平性，这在匹配森林的三角矩阵结构中是合理的。虽然可以从inKir\ {a}ly和Yokoi引理中推导出这个公平划分的存在性，但我们给出了它的直接和更简单的证明。对于$b$分支，我们定义了一个基于$b$分支的大小和所有顶点的度的公平性概念，并证明了一个公平分区总是存在的。然后导出了相关多面体的整数分解性质。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Discret. Math. Theor. Comput. Sci.

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