Unified Polynomial Dynamic Programming Algorithms for P-Center Variants in a 2D Pareto Front

With many efficient solutions for a multi-objective optimization problem, this paper aims to cluster the Pareto Front in a given number of clusters K and to detect isolated points. K-center problems and variants are investigated with a unified formulation considering the discrete and continuous vers...

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Bibliographic Details
Published in	Mathematics Vol. 9; no. 4; p. 453
Main Authors	Dupin, Nicolas, Nielsen, Frank, Talbi, El-Ghazali
Format	Journal Article
Language	English
Published	Basel MDPI AG 23.02.2021 MDPI
Subjects	[INFO.INFO-CC] Computer Science [cs]/Computational Complexity [cs.CC] [INFO.INFO-CG] Computer Science [cs]/Computational Geometry [cs.CG] [INFO.INFO-RO] Computer Science [cs]/Operations Research [math.OC] [INFO.INFO-RO]Computer Science [cs]/Operations Research [cs.RO] [INFO]Computer Science [cs] [MATH.MATH-OC]Mathematics [math]/Optimization and Control [math.OC] Algorithms bi-objective optimization Clustering Complexity Computational Complexity Computational Geometry Computer Science Discrete optimization Dynamic programming Food science K-center Linear programming Mathematics Multiple objective analysis Objectives Operational research Operations Research Optimization Optimization and Control P-center Parallel programming Pareto Front Pareto optimization Polynomials QA1-939 Sum-diameter clustering sum-radii clustering Operational research Clustering Pareto Front Complexity Sum-diameter clustering Computational geometry Bi-objective optimization Parallel programming Algorithms K-center Discrete optimization Sum-radii clustering P-center Dynamic programming
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ISSN	2227-7390 2227-7390
DOI	10.3390/math9040453

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Summary:	With many efficient solutions for a multi-objective optimization problem, this paper aims to cluster the Pareto Front in a given number of clusters K and to detect isolated points. K-center problems and variants are investigated with a unified formulation considering the discrete and continuous versions, partial K-center problems, and their min-sum-K-radii variants. In dimension three (or upper), this induces NP-hard complexities. In the planar case, common optimality property is proven: non-nested optimal solutions exist. This induces a common dynamic programming algorithm running in polynomial time. Specific improvements hold for some variants, such as K-center problems and min-sum K-radii on a line. When applied to N points and allowing to uncover M<N points, K-center and min-sum-K-radii variants are, respectively, solvable in O(K(M+1)NlogN) and O(K(M+1)N2) time. Such complexity of results allows an efficient straightforward implementation. Parallel implementations can also be designed for a practical speed-up. Their application inside multi-objective heuristics is discussed to archive partial Pareto fronts, with a special interest in partial clustering variants.
Bibliography:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	2227-7390 2227-7390
DOI:	10.3390/math9040453