A Polynomial-time Bicriteria Approximation Scheme for Planar Bisection

K. Fox, P. Klein, S. Mozes
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引用次数: 7

Abstract

Given an undirected graph with edge costs and node weights, the minimum bisection problem asks for a partition of the nodes into two parts of equal weight such that the sum of edge costs between the parts is minimized. We give a polynomial time bicriteria approximation scheme for bisection on planar graphs. Specifically, let W be the total weight of all nodes in a planar graph G. For any constant ε > 0, our algorithm outputs a bipartition of the nodes such that each part weighs at most W/2 + ε and the total cost of edges crossing the partition is at most (1+ε) times the total cost of the optimal bisection. The previously best known approximation for planar minimum bisection, even with unit node weights, was ~O(log n). Our algorithm actually solves a more general problem where the input may include a target weight for the smaller side of the bipartition.
平面剖分的多项式时间双准则逼近格式
给定一个具有边代价和节点权值的无向图,最小对分问题要求将节点划分为两个权值相等的部分,使各部分之间的边代价之和最小。给出了平面图上平分的多项式时间双准则近似格式。具体地说,设W为平面图g中所有节点的总权重。对于任意常数ε > 0,我们的算法输出节点的二分割,使得每个部分的权重不超过W/2 +ε,并且穿过该分割的边的总代价不超过(1+ε)倍于最优二分割的总代价。以前最著名的平面最小平分近似,即使是单位节点权重,也是~O(log n)。我们的算法实际上解决了一个更一般的问题,即输入可能包括二分划较小边的目标权重。
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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