Nearly ETH-tight Algorithms for Planar Steiner Tree with Terminals on Few Faces

ACM Transactions on Algorithms (TALG) Pub Date : 2018-11-16 DOI:10.1145/3371389

Sándor Kisfaludi-Bak, Jesper Nederlof, E. J. V. Leeuwen

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引用次数: 7

Abstract

The STEINER TREE problem is one of the most fundamental NP-complete problems, as it models many network design problems. Recall that an instance of this problem consists of a graph with edge weights and a subset of vertices (often called terminals); the goal is to find a subtree of the graph of minimum total weight that connects all terminals. A seminal paper by Erickson et al. [Math. Oper. Res., 1987{ considers instances where the underlying graph is planar and all terminals can be covered by the boundary of k faces. Erickson et al. show that the problem can be solved by an algorithm using nO(k) time and nO(k) space, where n denotes the number of vertices of the input graph. In the past 30 years there has been no significant improvement of this algorithm, despite several efforts. In this work, we give an algorithm for PLANAR STEINER TREE with running time 2O(k)nO(√k) with the above parameterization, using only polynomial space. Furthermore, we show that the running time of our algorithm is almost tight: We prove that there is no f(k)no(√k) algorithm for PLANAR STEINER TREE for any computable function f, unless the Exponential Time Hypothesis fails.

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终端少面的平面Steiner树的近eth紧算法

斯坦纳树问题是最基本的np完全问题之一，因为它模拟了许多网络设计问题。回想一下，这个问题的一个实例由一个具有边权的图和一个顶点子集(通常称为终端)组成;目标是找到连接所有终端的总权值最小的图的子树。Erickson等人的一篇开创性论文。③。Res.， 1987{考虑了底层图形是平面的并且所有端点都可以被k个面的边界覆盖的实例。Erickson等人表明，该问题可以通过使用nO(k)时间和nO(k)空间的算法来解决，其中n表示输入图的顶点数。在过去的30年里，尽管做出了一些努力，但该算法并没有显著的改进。本文仅使用多项式空间，给出了运行时间为2O(k)nO(√k)的PLANAR STEINER TREE算法。此外，我们证明了该算法的运行时间几乎是紧的:我们证明了对于任何可计算函数f，除非指数时间假设失效，否则PLANAR STEINER TREE不存在f(k)no(√k)算法。

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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ACM Transactions on Algorithms (TALG)

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