Traveling Repairperson, Unrelated Machines, and Other Stories About Average Completion Times

Publication date

2021-07-02

Authors

Bienkowski, Marcin
Kraska, Artur
Liu, AlisonISNI 0000000492910289

Editors

Bansal , Nikhil
Merelli , Emanuela
Worrell , James

Advisors

Supervisors

Document Type

Part of book
Open Access logo

License

cc_by

Abstract

We present a unified framework for minimizing average completion time for many seemingly disparate online scheduling problems, such as the traveling repairperson problems (TRP), dial-a-ride problems (DARP), and scheduling on unrelated machines. We construct a simple algorithm that handles all these scheduling problems, by computing and later executing auxiliary schedules, each optimizing a certain function on already seen prefix of the input. The optimized function resembles a prize-collecting variant of the original scheduling problem. By a careful analysis of the interplay between these auxiliary schedules, and later employing the resulting inequalities in a factor-revealing linear program, we obtain improved bounds on the competitive ratio for all these scheduling problems. In particular, our techniques yield a 4-competitive deterministic algorithm for all previously studied variants of online TRP and DARP, and a 3-competitive one for the scheduling on unrelated machines (also with precedence constraints). This improves over currently best ratios for these problems that are 5.14 and 4, respectively. We also show how to use randomization to further reduce the competitive ratios to 1+2/ln 3 < 2.821 and 1+1/ln 2 < 2.443, respectively. The randomized bounds also substantially improve the current state of the art. Our upper bound for DARP contradicts the lower bound of 3 given by Fink et al. (Inf. Process. Lett. 2009); we pinpoint a flaw in their proof.

Keywords

traveling repairperson problem, dial-a-ride, machine scheduling, unrelatedmachines, minimizing completion time, competitive analysis, factor-revealing LP

Citation

Bienkowski, M, Kraska, A & Liu, H-H 2021, Traveling Repairperson, Unrelated Machines, and Other Stories About Average Completion Times. in N Bansal , E Merelli & J Worrell (eds), 48th International Colloquium on Automata, Languages, and Programming (ICALP 2021)., 28, LIPIcs, vol. 198, Leibniz International Proceedings in Informatics (LIPIcs), pp. 28:1-28:20, The 48th International Colloquium on Automata, Languages, and Programming, 12/07/21. https://doi.org/10.4230/LIPIcs.ICALP.2021.28, conference