2019
DOI: 10.1137/17m1122529
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A Robust AFPTAS for Online Bin Packing with Polynomial Migration

Abstract: We consider the relaxed online strip packing problem: Rectangular items arrive online and have to be packed without rotations into a strip of fixed width such that the packing height is minimized. Thereby, repacking of previously packed items is allowed. The amount of repacking is measured by the migration factor, defined as the total size of repacked items divided by the size of the arriving item. First, we show that no algorithm with constant migration factor can produce solutions with asymptotic ratio bette… Show more

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Cited by 14 publications
(39 citation statements)
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“…The running time is polynomial in n and 1 /ǫ. In case that no deletions are used, the algorithm has a migration factor of O( 1 /ǫ 3 · log( 1 /ǫ)), which beats the best known migration factor of O( 1 /ǫ 4 ) by Jansen and Klein [JK13]. Since the number of repacked bins is bounded, so is the number of shifting moves as it requires at most O( 1 /ǫ) shifting moves to repack a single bin.…”
Section: Resultsmentioning
confidence: 86%
See 2 more Smart Citations
“…The running time is polynomial in n and 1 /ǫ. In case that no deletions are used, the algorithm has a migration factor of O( 1 /ǫ 3 · log( 1 /ǫ)), which beats the best known migration factor of O( 1 /ǫ 4 ) by Jansen and Klein [JK13]. Since the number of repacked bins is bounded, so is the number of shifting moves as it requires at most O( 1 /ǫ) shifting moves to repack a single bin.…”
Section: Resultsmentioning
confidence: 86%
“…They also proved that there is no online algorithm for this problem that has a constant migration factor and that maintains an optimal solution. The APTAS by Epstein and Levin was later improved by Jansen and Klein [JK13], who developed a robust AFPTAS for the problem with migration factor O( 1 /ǫ 4 ). In their paper, they developed new linear program (LP)/integer linear program (ILP) techniques, which we make use of to obtain polynomial migration.…”
Section: Related Results On the Migration Factormentioning
confidence: 99%
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“…For the Bin Packing problem, Epstein and Levin [11] gave the first robust 1+ǫ-competitive algorithm for Bin Packing based on the same sensitivity results for integer programming. Jansen and Klein [17] designed new techniques in order to obtain a migration factor polynomial in 1/ǫ. These techniques were improved by Berndt et al [5] to also handle the dynamic version of the Bin Packing problem where items can also depart.…”
Section: Related Workmentioning
confidence: 99%
“…This problem has been studied intensively in the online setting (see for example the works cited in [8]). Jansen et al [18] studied the static case in the migration scenario, where rectangles can only arrive.…”
Section: -Dimensional Strip Packingmentioning
confidence: 99%