Improved Heuristics with Data Rounding for Combinatorial Food Packing Problems

2014 IEEE 7th International Conference on Service-Oriented Computing and Applications Pub Date : 2014-11-17 DOI:10.1109/SOCA.2014.15

Y. Karuno, Kenju Tateishi

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引用次数: 8

Abstract

Given a set I = {i | i = 1, 2, . . . , n} of current n items (for example, n green peppers) with their weights w_i and priorities r_i, a lexicographic bi-criteria combinatorial food packing problem asks to find a subset I' (⊆ I) so that the total weight Σ_i∈I' w_i is no less than a specified target bound b for each package, and it is minimized as the primary objective, and further the total priority Σ_i∈I' r_i is maximized as the second objective. The problem has been known to be NP-hard, while it can be solved exactly in O(nb) time if all the input data are assumed to be integral. For a given real ε > 0, an O(n²/ε) time heuristic algorithm with a data rounding technique has been designed and the heuristic total weight has been shown to be at most (2+ε) times the optimal total weight. In this paper, a modification of the data rounding heuristic is proposed, and it is shown that the proposed modification delivers a heuristic solution such that the total weight is at most (1 + ε) times the optimum.

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组合食品包装问题的数据舍入改进启发式算法

给定一个集合I = {I | I = 1,2，…在当前n个物品(例如n个青椒)的权重为wi、优先级为ri的情况下(n})，一个词典双标准组合食品包装问题要求找到一个子集I’(I)，使每个包裹的总重量Σi∈I’wi不小于指定目标界b，并将其最小化作为第一目标，进一步将总优先级Σi∈I’ri最大化作为第二目标。已知该问题是np困难的，而如果假设所有输入数据都是积分，则可以在O(nb)时间内精确地解决该问题。对于给定的实数ε >，设计了一个O(n2/ε)时间的带数据舍入技术的启发式算法，并证明了启发式总权重最多为最优总权重的(2+ε)倍。本文提出了对数据舍入启发式的改进，并证明了改进后的启发式解使得总权重不超过最优值的(1 + ε)倍。

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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2014 IEEE 7th International Conference on Service-Oriented Computing and Applications

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