Minimizing value-at-risk in single-machine scheduling

The vast majority of the machine scheduling literature focuses on deterministic problems in which all data is known with certainty a priori. In practice, this assumption implies that the random parameters in the problem are represented by their point estimates in the scheduling model. The resulting...

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Bibliographic Details
Published in:Annals of operations research 2017, Vol.248 (1-2), p.25-73
Main Authors: Atakan, Semih, Bülbül, Kerem, Noyan, Nilay
Format: Article
Language:English
Subjects:
Algorithms
Business and Management
Combinatorics
Confidence intervals
Constraint modelling
Decision making
Expected values
Job shops
Linear programming
Machine shop practice
Management science
Mathematical models
Methods
Operations research
Operations Research/Decision Theory
Original Paper
Parameters
Production scheduling
Risk aversion
Schedules
Scheduling
Scheduling (Management)
Stochastic programming
Studies
Theory of Computation
Uncertainty
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Summary:The vast majority of the machine scheduling literature focuses on deterministic problems in which all data is known with certainty a priori. In practice, this assumption implies that the random parameters in the problem are represented by their point estimates in the scheduling model. The resulting schedules may perform well if the variability in the problem parameters is low. However, as variability increases accounting for this randomness explicitly in the model becomes crucial in order to counteract the ill effects of the variability on the system performance. In this paper, we consider single-machine scheduling problems in the presence of uncertain parameters. We impose a probabilistic constraint on the random performance measure of interest, such as the total weighted completion time or the total weighted tardiness, and introduce a generic risk-averse stochastic programming model. In particular, the objective of the proposed model is to find a non-preemptive static job processing sequence that minimizes the value-at-risk (VaR) of the random performance measure at a specified confidence level. We propose a Lagrangian relaxation-based scenario decomposition method to obtain lower bounds on the optimal VaR and provide a stabilized cut generation algorithm to solve the Lagrangian dual problem. Furthermore, we identify promising schedules for the original problem by a simple primal heuristic. An extensive computational study on two selected performance measures is presented to demonstrate the value of the proposed model and the effectiveness of our solution method.
ISSN:0254-5330
1572-9338
DOI:10.1007/s10479-016-2251-z