Transshipment prices and pair-wise stability in coordinating the decentralized transshipment problem
Transshipment prices and pair-wise stability in coordinating the decentralized transshipment problem
The decentralized transshipment problem is a two-stage decision making problem where the companies first choose their individual production levels in anticipation of random demands and after demand realizations they pool residuals via transshipment. The coordination will be achieved if at optimality all the decision variables, i.e. production levels and transshipment patterns, in the decentralized system are the same as those of centralized system. In this paper, we study the coordination via transshipment prices. We propose a procedure for deriving the transshipment prices based on the coordinating allocation rule introduced by Anupindi et al. [1]. With the transshipment prices being set, the companies are free to match their residuals based on their individual preferences. We draw upon the concept of pair-wise stability to capture the dynamics of corresponding matching process. As the main result of this paper, we show that with the derived transshipment prices, the optimum transshipment patterns are always pair-wise stable, i.e. there are no pairs of companies that can be jointly better off by unilaterally deviating from the optimum transshipment patterns.
Association for Computing Machinery
Hezarkhani, B.
ae3fc227-94dc-47bd-b52c-2fdf90277bef
Kubiak, W.
7020eb70-23e1-49f5-bc49-f743837523b4
14 May 2010
Hezarkhani, B.
ae3fc227-94dc-47bd-b52c-2fdf90277bef
Kubiak, W.
7020eb70-23e1-49f5-bc49-f743837523b4
Hezarkhani, B. and Kubiak, W.
(2010)
Transshipment prices and pair-wise stability in coordinating the decentralized transshipment problem.
In Behavioral and Quantitative Game Theory: Conference on Future Directions 2010, BQGT 2010.
Association for Computing Machinery.
6 pp
.
(doi:10.1145/1807406.1807439).
Record type:
Conference or Workshop Item
(Paper)
Abstract
The decentralized transshipment problem is a two-stage decision making problem where the companies first choose their individual production levels in anticipation of random demands and after demand realizations they pool residuals via transshipment. The coordination will be achieved if at optimality all the decision variables, i.e. production levels and transshipment patterns, in the decentralized system are the same as those of centralized system. In this paper, we study the coordination via transshipment prices. We propose a procedure for deriving the transshipment prices based on the coordinating allocation rule introduced by Anupindi et al. [1]. With the transshipment prices being set, the companies are free to match their residuals based on their individual preferences. We draw upon the concept of pair-wise stability to capture the dynamics of corresponding matching process. As the main result of this paper, we show that with the derived transshipment prices, the optimum transshipment patterns are always pair-wise stable, i.e. there are no pairs of companies that can be jointly better off by unilaterally deviating from the optimum transshipment patterns.
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Published date: 14 May 2010
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Behavioural and Quantitative Game Theory : conference on Future Directions, Newport Beach, United States, 2010-05-14 - 2010-05-16
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Local EPrints ID: 479853
URI: http://eprints.soton.ac.uk/id/eprint/479853
PURE UUID: 4fcc5198-3b16-4709-afcb-e19b423a588c
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Date deposited: 27 Jul 2023 16:10
Last modified: 17 Mar 2024 04:21
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Author:
B. Hezarkhani
Author:
W. Kubiak
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