Scheduling lower bounds via AND subset sum
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摘要
Given N instances (X1,t1),…,(XN,tN) of Subset Sum, the AND Subset Sum problem asks to determine whether all of these instances are yes-instances; that is, whether each set of integers Xi has a subset that sums up to the target integer ti. We prove that this problem cannot be solved in time O˜((N⋅tmax)1−ε), for tmax=maxiti and any ε>0, assuming the ∀∃ Strong Exponential Time Hypothesis (∀∃-SETH). We then use this result to exclude O˜(n+pmax⋅n1−ε)-time algorithms for several scheduling problems on n jobs with maximum processing time pmax, assuming ∀∃-SETH. These include classical problems such as 1||∑wjUj, the problem of minimizing the total weight of tardy jobs on a single machine, and P2||∑Uj, the problem of minimizing the number of tardy jobs on two identical parallel machines.
论文关键词:Scheduling,Single machine problems,Parallel machine problems,SETH,Subset sum,Lower bounds
论文评审过程:Received 31 December 2020, Revised 10 December 2021, Accepted 27 January 2022, Available online 10 February 2022, Version of Record 18 February 2022.
论文官网地址:https://doi.org/10.1016/j.jcss.2022.01.005