Strongly Polynomial Primal-Dual Algorithms for Concave Cost Combinatorial Optimization Problems [Articol]
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Date
2024
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Abstract
We introduce an algorithm design technique for a class of combinatorial optimization problems with concave costs. This technique yields a strongly polynomial primal-dual algorithm for a concave cost problem whenever such an algorithm exists for the fixed-charge counterpart of the problem. Using our technique, we obtain a 1.61-approximation algorithm for the concave cost facility location problem, an exact algorithm for the concave cost lot-sizing problem, and a 4-approximation algorithm for the joint replenishment problem with general concave individual ordering costs.
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concave costs, facility location, lot-sizing, joint replenishment problems, primal-dual algorithms
Citation
MAGNANTI, Thomas L. and Dan STRATILA. Strongly Polynomial Primal-Dual Algorithms for Concave Cost Combinatorial Optimization Problems. In: International Conference dedicated to the 60th anniversary of the foundation of Vladimir Andrunachievici Institute of Mathematics and Computer Science, MSU, October 10-13 2024. Chisinau: [S. n.], 2024, pp. 452-455. ISBN 978-9975-68-515-3.