Optimal Multi-Way Number Partitioning

Ethan L. Schreiber
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引用次数: 55

Abstract

The NP-hard number-partitioning problem is to separate a multiset S of n positive integers into k subsets such that the largest sum of the integers assigned to any subset is minimized. The classic application is scheduling a set of n jobs with different runtimes on k identical machines such that the makespan, the elapsed time to complete the schedule, is minimized. The two-way number-partitioning decision problem is one of the original 21 problems that Richard Karp proved NP-complete. It is also one of Garey and Johnson’s six fundamental NP-complete problems and the only one based on numbers. This article explores algorithms for solving multi-way number-partitioning problems optimally. We explore previous algorithms as well as our own algorithms, which fall into three categories: sequential number partitioning (SNP), a branch-and-bound algorithm; binary-search improved bin completion (BSIBC), a bin-packing algorithm; and cached iterative weakening (CIW), an iterative weakening algorithm. We show experimentally that, for large random numbers, SNP and CIW are state-of-the-art algorithms depending on the values of n and k. Both algorithms outperform the previous state of the art by up to seven orders of magnitude in terms of runtime.
最优多路数字分区
NP-hard数字划分问题是将n个正整数的多集S分成k个子集,使得分配给任意子集的整数的最大和最小。经典的应用程序是在k台相同的机器上调度一组n个具有不同运行时的作业,以便最小化makespan(完成调度所花费的时间)。双向数字划分决策问题是Richard Karp最早证明np完全的21个问题之一。它也是gary和Johnson的六个基本np完全问题之一,也是唯一一个基于数字的np完全问题。本文探讨了最优地解决多路数字划分问题的算法。我们探索了以前的算法以及我们自己的算法,它们分为三类:序列号划分(SNP),一种分支定界算法;二叉搜索改进箱补全(BSIBC),一种装箱算法;缓存迭代弱化(CIW),一种迭代弱化算法。我们通过实验证明,对于大随机数,SNP和CIW是最先进的算法,取决于n和k的值。就运行时间而言,这两种算法的性能都比以前的最先进的算法高出七个数量级。
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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