Basis sequence reconfiguration in the union of matroids

Tesshu Hanaka, Yuni Iwamasa, Yasuaki Kobayashi, Yuto Okada, Rin Saito
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Abstract

Given a graph $G$ and two spanning trees $T$ and $T'$ in $G$, Spanning Tree Reconfiguration asks whether there is a step-by-step transformation from $T$ to $T'$ such that all intermediates are also spanning trees of $G$, by exchanging an edge in $T$ with an edge outside $T$ at a single step. This problem is naturally related to matroid theory, which shows that there always exists such a transformation for any pair of $T$ and $T'$. Motivated by this example, we study the problem of transforming a sequence of spanning trees into another sequence of spanning trees. We formulate this problem in the language of matroid theory: Given two sequences of bases of matroids, the goal is to decide whether there is a transformation between these sequences. We design a polynomial-time algorithm for this problem, even if the matroids are given as basis oracles. To complement this algorithmic result, we show that the problem of finding a shortest transformation is NP-hard to approximate within a factor of $c \log n$ for some constant $c > 0$, where $n$ is the total size of the ground sets of the input matroids.
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矩阵联盟中的基序重构
给定一个图 $G$ 和 $G$ 中的两棵生成树 $T$ 和 $T'$,生成树配置(Spanning TreeReconfiguration)问是否存在一种从 $T$ 到 $T'$ 的逐步变换,即通过将 $T$ 中的一条边与 $T$ 外的一条边进行单步交换,使所有中间树也是 $G$ 的生成树。这个问题自然与矩阵理论有关,矩阵理论表明,对于任何一对 $T$ 和 $T'$ 总存在这样的变换。受这个例子的启发,我们研究了将一列生成树转化为另一列生成树的问题。我们用矩阵理论的语言来表述这个问题:给定两个矩阵基序列,目标是判定这两个序列之间是否存在变换。我们为这个问题设计了一种多项式时间算法,即使给出的矩阵是基奥阱。作为对这一算法结果的补充,我们证明了寻找最短变换的问题在某个常数 $c > 0$ (其中 $n$ 是输入矩阵的地面集的总大小)的 $c \log n$ 因数范围内是 NP 难近似的。
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