English

Random Almost-Popular Matchings

Discrete Mathematics 2016-10-04 v3

Abstract

For a set AA of nn people and a set BB of mm items, with each person having a preference list that ranks all items from most wanted to least wanted, we consider the problem of matching every person with a unique item. A matching MM is called ϵ\epsilon-popular if for any other matching MM', the number of people who prefer MM' to MM is at most ϵn\epsilon n plus the number of those who prefer MM to MM'. In 2006, Mahdian showed that when randomly generating people's preference lists, if m/n>1.42m/n > 1.42, then a 0-popular matching exists with 1o(1)1-o(1) probability; and if m/n<1.42m/n < 1.42, then a 0-popular matching exists with o(1)o(1) probability. The ratio 1.42 can be viewed as a transition point, at which the probability rises from asymptotically zero to asymptotically one, for the case ϵ=0\epsilon=0. In this paper, we introduce an upper bound and a lower bound of the transition point in more general cases. In particular, we show that when randomly generating each person's preference list, if α(1e1/α)>1ϵ\alpha(1-e^{-1/\alpha}) > 1-\epsilon, then an ϵ\epsilon-popular matching exists with 1o(1)1-o(1) probability (upper bound); and if α(1e(1+e1/α)/α)<12ϵ\alpha(1-e^{-(1+e^{1/\alpha})/\alpha}) < 1-2\epsilon, then an ϵ\epsilon-popular matching exists with o(1)o(1) probability (lower bound).

Cite

@article{arxiv.1410.6890,
  title  = {Random Almost-Popular Matchings},
  author = {Suthee Ruangwises and Osamu Watanabe},
  journal= {arXiv preprint arXiv:1410.6890},
  year   = {2016}
}

Comments

This paper has been withdrawn by the authors due to an error in the lower bound

R2 v1 2026-06-22T06:36:18.689Z