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Abstract
This paper introduces the maximum length car sequencing problem to support the assembly operations of a multinational automotive company. We propose an integer linear programming (ILP) formulation to schedule the maximum number of cars without violating the so-called option constraints. In addition, we present valid combinatorial lower and upper bounds, which can be calculated in less than 0.01 s, as well as binary and iterative search algorithms to solve the problem when good primal bounds are not readily available. To quickly obtain high-quality solutions, we devise an effective iterated local search algorithm, and we use the heuristic solutions as warm start to further enhance the performance of the exact methods. Computational results demonstrate that relatively low gaps were achieved for benchmark instances within a time limit of ten minutes. We also conducted an instance space analysis to identify the features that make the problem more difficult to solve. Moreover, the instances reflecting the company's needs could be solved to optimality in less than a second. Finally, simulations with real-world demands, divided into shifts, were conducted over a period of four months. In this case, we use the proposed ILP model in all shifts except the last one of each month, for which we employ an alternative ILP model to sequence the unscheduled cars, adjusting the pace of the assembly line in an optimal fashion. The results pointed out that the latter was necessary in only one of the months.
Original language | English |
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Pages (from-to) | 707-717 |
Number of pages | 11 |
Journal | European Journal of Operational Research |
Volume | 316 |
Issue number | 2 |
Early online date | 22 Feb 2024 |
DOIs | |
Publication status | Published - 16 Jul 2024 |
Bibliographical note
We would like to warmly thank Prof. Artur Pessoa for his valuable suggestions regarding the mathematical formulations, as well as Dr. Yuan Sun for kindly providing the set of instances used in his study, and the anonymous reviewers for the relevant insights that considerably helped to improve the quality of the paper. This research was partially supported by CNPq, Brazil, grants 406245/2021-5 and 309580/2021-8, and by the Paraíba State Research Foundation (FAPESQ), Brazil, grant 041/2023. The work reported in this paper was undertaken as part of the Made Smarter Innovation: Centre for People-Led Digitalisation, at the University of Bath, University of Nottingham, and Loughborough University. The project is funded by the Engineering and Physical Sciences Research Council (EPSRC), United Kingdom Grant EP/V062042/1.Funding
We would like to warmly thank Prof. Artur Pessoa for his valuable suggestions regarding the mathematical formulations, as well as Dr. Yuan Sun for kindly providing the set of instances used in his study, and the anonymous reviewers for the relevant insights that considerably helped to improve the quality of the paper. This research was partially supported by CNPq, Brazil, grants 406245/2021-5 and 309580/2021-8, and by the Paraíba State Research Foundation (FAPESQ), Brazil, grant 041/2023. The work reported in this paper was undertaken as part of the Made Smarter Innovation: Centre for People-Led Digitalisation, at the University of Bath, University of Nottingham, and Loughborough University. The project is funded by the Engineering and Physical Sciences Research Council (EPSRC), United Kingdom Grant EP/V062042/1. We would like to warmly thank Prof. Artur Pessoa for his valuable suggestions regarding the mathematical formulations, as well as Dr. Yuan Sun for kindly providing the set of instances used in his study, and the anonymous reviewers for the relevant insights that considerably helped to improve the quality of the paper. This research was partially supported by CNPq, Brazil , grants 406245/2021-5 and 309580/2021-8 , and by the Paraíba State Research Foundation (FAPESQ), Brazil , grant 041/2023 . The work reported in this paper was undertaken as part of the Made Smarter Innovation: Centre for People-Led Digitalisation, at the University of Bath, University of Nottingham, and Loughborough University. The project is funded by the Engineering and Physical Sciences Research Council (EPSRC), United Kingdom Grant EP/V062042/1 .
Funders | Funder number |
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Paraíba State Research Foundation | |
Engineering and Physical Sciences Research Council | EP/V062042/1 |
University of Nottingham | |
Loughborough University | |
Conselho Nacional de Desenvolvimento Cientifico e Tecnologico | 406245/2021-5, 309580/2021-8 |
Fundação de Apoio à Pesquisa do Estado da Paraíba | 041/2023 |
Keywords
- Assembly line
- Car sequencing
- Combinatorial optimization
- Scheduling
ASJC Scopus subject areas
- Information Systems and Management
- General Computer Science
- Modelling and Simulation
- Management Science and Operations Research
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- 1 Finished
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Made Smarter Innovation - People-Led Digitalisation
Edwards, B. (PI)
Engineering and Physical Sciences Research Council
1/09/21 → 30/06/22
Project: Research council