Online bin packing problem with buffer and bounded size revisited

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• 作者：Minghui Zhang ; Xin Han ; Yan Lan ; Hing-Fung Ting
• 关键词：Bin packing ; Online algorithm ; Asymptotic competitive ratio
• 刊名：Journal of Combinatorial Optimization
• 出版年：2017
• 出版时间：February 2017
• 年：2017
• 卷：33
• 期：2
• 页码：530-542
• 全文大小：
• 刊物类别：Mathematics and Statistics
• 刊物主题：Combinatorics; Convex and Discrete Geometry; Mathematical Modeling and Industrial Mathematics; Theory of Computation; Optimization; Operation Research/Decision Theory;
• 出版者：Springer US
• ISSN：1573-2886
• 卷排序：33

文摘

In this paper we study the online bin packing with buffer and bounded size, i.e., there are items with size within \((\alpha ,1/2]\) where \(0 \le \alpha < 1/2 \), and there is a buffer with constant size. Each time when a new item is given, it can be stored in the buffer temporarily or packed into some bin, once it is packed in the bin, we cannot repack it. If the input is ended, the items in the buffer should be packed into bins too. In our setting, any time there is at most one bin open, i.e., that bin can accept new items, and all the other bins are closed. This problem is first studied by Zheng et al. (J Combin Optim 30(2):360–369, 2015), and they proposed a 1.4444-competitive algorithm and a lower bound 1.3333 on the competitive ratio. We improve the lower bound from 1.3333 to 1.4230, and the upper bound from 1.4444 to 1.4243.