Abstract
An input to the Popular Matching problem, in the roommates setting, consists of a graph G where each vertex ranks its neighbors in strict order, known as its preference. In the Popular Matching problem the objective is to test whether there exists a matching M?such that there is no matching M where more people (vertices) are happier (in terms of the preferences) with M than with M?. In this paper we settle the computational complexity of the Popular Matching problem in the roommates setting by showing that the problem is NP-complete. Thus, we resolve an open question that has been repeatedly and explicitly asked over the last decade.
Cite
CITATION STYLE
Gupta, S., Misra, P., Saurabh, S., & Zehavi, M. (2019). Popular matching in roommates setting is NP-hard. In Proceedings of the Annual ACM-SIAM Symposium on Discrete Algorithms (pp. 2810–2822). Association for Computing Machinery. https://doi.org/10.1137/1.9781611975482.174
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