On random exchange-stable matchings
Abstract
Consider the group of men and women, each with their own preference list for a potential marriage partner. The stable marriage is a bipartite matching such that no unmatched pair (man, woman) prefer each other to their partners in the matching. Its non-bipartite version, with an even number of members, is known as the stable roommates problem. Jose Alcalde introduced an alternative notion of exchange-stable, one-sided, matching: no two members prefer each other's partners to their own partners in the matching. Katarina Cechl\'arov\'a and David Manlove showed that the e-stable matching decision problem is -complete for both types of matchings. We prove that the expected number of e-stable matchings is asymptotic to for two-sided case, and to for one-sided case. However, the standard deviation of this number exceeds , ( resp.). As an obvious byproduct, there exist instances of preference lists with at least ( resp.) e-stable matchings. The probability that there is no matching which is stable and e-stable is at least , ( resp.).
Keywords
Cite
@article{arxiv.1707.01540,
title = {On random exchange-stable matchings},
author = {Boris Pittel},
journal= {arXiv preprint arXiv:1707.01540},
year = {2017}
}
Comments
This revision contains a new result on likely incompatibility of classical stability and exchange stability. New references are added as well