An evaluation of semidefinite programming based approaches for discrete lot-sizing problems

•We study a lot-sizing problem with sequence-dependent changeover costs and times.•This problem is formulated as a quadratically constrained quadratic binary program.•We compute lower bounds using a semidefinite rather than a linear relaxation.•Comparison with the best known linear relaxations shows...

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Vydáno v:	European journal of operational research Ročník 237; číslo 2; s. 498 - 507
Hlavní autoři:	Gicquel, C., Lisser, A., Minoux, M.
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Amsterdam Elsevier B.V 01.09.2014 Elsevier Sequoia S.A Elsevier
Témata:	Comparative analysis Competitive advantage Computation Computer programs Computer Science Cutting planes Discrete lot-sizing and scheduling problem Integer programming Lower bounds Manufacturing Mathematical models Mathematical problems Mathematical programming Operational research Operations Research Optimization Quadratic programming Quadratically constrained quadratic binary programming Semidefinite programming Semidefinite relaxation Sequence-dependent changeover costs and times Solution strengthening Studies Quadratically constrained quadratic binary programming Discrete lot-sizing and scheduling problem Semidefinite relaxation Manufacturing Cutting planes Sequence-dependent changeover costs and times semidefinite relaxation manufacturing quadratically constrained quadratic binary programming cutting planes discrete lot-sizing and scheduling problem sequence-dependent changeover costs and times
ISSN:	0377-2217, 1872-6860
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Popis
Shrnutí:	•We study a lot-sizing problem with sequence-dependent changeover costs and times.•This problem is formulated as a quadratically constrained quadratic binary program.•We compute lower bounds using a semidefinite rather than a linear relaxation.•Comparison with the best known linear relaxations shows a significant improvement.•The SDP relaxation provides the optimal integer value for 83% of the small-size instances. The present work is intended as a first step towards applying semidefinite programming models and tools to discrete lot-sizing problems including sequence-dependent changeover costs and times. Such problems can be formulated as quadratically constrained quadratic binary programs. We investigate several semidefinite relaxations by combining known reformulation techniques recently proposed for generic quadratic binary problems with problem-specific strengthening procedures developed for lot-sizing problems. Our computational results show that the semidefinite relaxations consistently provide lower bounds of significantly improved quality as compared with those provided by the best previously published linear relaxations. In particular, the gap between the semidefinite relaxation and the optimal integer solution value can be closed for a significant proportion of the small-size instances, thus avoiding to resort to a tree search procedure. The reported computation times are significant. However improvements in SDP technology can still be expected in the future, making SDP based approaches to discrete lot-sizing more competitive.
Bibliografie:	SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 14 ObjectType-Article-2 content type line 23
ISSN:	0377-2217 1872-6860
DOI:	10.1016/j.ejor.2014.02.027