Better Approximation Guarantees for Job-Shop Scheduling
- 1 January 2001
- journal article
- Published by Society for Industrial & Applied Mathematics (SIAM) in SIAM Journal on Discrete Mathematics
- Vol. 14 (1) , 67-92
- https://doi.org/10.1137/s0895480199326104
Abstract
Job-shop scheduling is a classical NP-hard problem. Shmoys, Stein, and Wein presented the first polynomial-time approximation algorithm for this problem that has a good (polylogarithmic) approximation guarantee. We improve the approximation guarantee of their work and present further improvements for some important NP-hard special cases of this problem (e.g., in the preemptive case where machines can suspend work on operations and later resume). We also present NC algorithms with improved approximation guarantees for some NP-hard special cases.Keywords
This publication has 11 references indexed in Scilit:
- Fast Algorithms for Finding O(Congestion + Dilation) Packet Routing SchedulesCombinatorica, 1999
- Improved parallel approximation of a class of integer programming problemsAlgorithmica, 1997
- NP-hardness of shop-scheduling problems with three jobsDiscrete Applied Mathematics, 1995
- Chernoff–Hoeffding Bounds for Applications with Limited IndependenceSIAM Journal on Discrete Mathematics, 1995
- Packet routing and job-shop scheduling inO(congestion+dilation) stepsCombinatorica, 1994
- Improved Approximation Algorithms for Shop Scheduling ProblemsSIAM Journal on Computing, 1994
- A parallel algorithmic version of the local lemmaRandom Structures & Algorithms, 1991
- An algorithmic approach to the Lovász local lemma. IRandom Structures & Algorithms, 1991
- A Computational Study of the Job-Shop Scheduling ProblemINFORMS Journal on Computing, 1991
- An Algorithm for Solving the Job-Shop ProblemManagement Science, 1989