Ágoston, Kolos Csaba, Biró, Péter and Szántó, Richárd (2017) Stable project allocation under distributional constraints. In: Proceedings of the 10th Japanese-Hungarian Symposium on Discrete Mathematics and Its Applications. Budapest University of Technology and Economics, Budapest, pp. 43-52. . ISBN 9789633132531
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Official URL: http://real.mtak.hu/80726
Abstract
In a two-sided matching market when agents on both sides have preferences the stability of the solution is typically the most important requirement. However, we may also face some distributional constraints with regard to the minimum number of assignees or the distribution of the assignees according to their types. These two kind of requirements can be challenging to reconcile in practice. Our research is motivated by two real applications, a project allocation problem and a workshop assignment problem, both involving some distributional constraints. We used integer programming techniques to find reasonably good solutions with regard to the stability and the distributional constraints. Our approach can be useful in a variety of different applications, such as resident allocation with lower quotas, controlled school choice or college admissions with affirmative action.
Item Type: | Book Section |
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Uncontrolled Keywords: | stable matching, two-sided markets ; project allocation ; linear programming ; multi-criteria decision making |
Divisions: | Institute of Operations and Decision Sciences |
Subjects: | Computer science |
ID Code: | 10016 |
Deposited By: | MTMT SWORD |
Deposited On: | 17 Jun 2024 09:30 |
Last Modified: | 17 Jun 2024 09:30 |
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