A Simple 1.5-approximation Algorithm for a Wide Range of Maximum Size Stable Matching Problems
Pages 409 - 415
Abstract
We give a simple approximation algorithm for a common generalization of many previously studied extensions of the maximum size stable matching problem with ties. These generalizations include the existence of critical vertices in the graph, amongst whom we must match as much as possible, free edges, that cannot be blocking edges and Δ-stabilities, which mean that for an edge to block, the improvement should be large enough on one or both sides. We also introduce other notions to generalize these even further, which allows our framework to capture many existing and future applications. We show that the edge duplicating technique allows us to treat these different types of generalizations simultaneously, while also making the algorithm, the proofs and the analysis much simpler and shorter than in previous approaches. In particular, we answer an open question by Askalidis et al.[1] about the existence of a 3 over 2-approximation algorithm for the SMTI problem with free edges. This demonstrates that this technique can grasp the underlying essence of these problems quite well and have the potential to be able to solve many future applications.
References
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Georgios Askalidis, Nicole Immorlica, Augustine Kwanashie, David F Manlove, and Emmanouil Pountourakis. 2013. Socially stable matchings in the hospitals/residents problem. In Algorithms and Data Structures: 13th International Symposium, WADS 2013, London, ON, Canada, August 12-14, 2013. Proceedings 13. Springer, 85--96.
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Index Terms
- A Simple 1.5-approximation Algorithm for a Wide Range of Maximum Size Stable Matching Problems
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Published In
May 2024
2898 pages
ISBN:9798400704864
- General Chairs:
- Mehdi Dastani,
- Jaime Simão Sichman,
- Program Chairs:
- Natasha Alechina,
- Virginia Dignum
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International Foundation for Autonomous Agents and Multiagent Systems
Richland, SC
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Published: 06 May 2024
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- Hungarian Academy of Sciences
- Hungarian Scientific Research Fund
- Ministry of Innovation and Technology funded by the National Research Development and Innovation Fund
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AAMAS '24
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AAMAS '24: International Conference on Autonomous Agents and Multiagent Systems
May 6 - 10, 2024
Auckland, New Zealand
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