度受限树最小切割问题的多项式时间算法

23rd Annual Symposium on Foundations of Computer Science (sfcs 1982) Pub Date : 1982-11-03 DOI:10.1137/0214013

M. Chung, F. Makedon, I. H. Sudborough, J. Turner

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引用次数: 59

摘要

给出了一种求解度受限树上最小割线性排列问题的多项式算法。例如，任意阶d树的切面宽度或折叠数可以在O(n(logn)d-2)步中找到。这也产生了一种确定三度树的黑/白鹅卵石需求的算法。对于具有宽度为k的三阶树，给出了一个禁止子图特征。这产生了一个有趣的推论:对于三阶树，宽度与搜索数相同。

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Polynomial time algorithms for the MIN CUT problem on degree restricted trees

Polynomial algorithms are described that solve the MIN CUT LINEAR ARRANGEMENT problem on degree restricted trees. For example, the cutwidth or folding number of an arbitrary degree d tree can be found in O(n(logn)d-2) steps. This also yields an algorithm for determining the black/white pebble demand of degree three trees. A forbidden subgraph characterization is given for degree three trees having cutwidth k. This yields an interesting corollary: for degree three trees, cutwidth is identical to search number.

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23rd Annual Symposium on Foundations of Computer Science (sfcs 1982)

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