Manipulation of Stable Matchings using Minimal Blacklists

TL;DR

This paper investigates how women in the Gale-Shapley stable matching algorithm can strategically manipulate outcomes using minimal blacklists, providing tight bounds and efficient algorithms for achieving desired matchings.

Contribution

It offers the first tight bounds on blacklists needed for women to force specific stable matchings, expanding understanding of strategic manipulation in stable matching markets.

Findings

Women can force any matching with blacklists where at most half have nonempty blacklists.

Average blacklist size can be less than 1, making manipulation less conspicuous.

Strategies are constructive and supported by efficient algorithms.

Abstract

Gale and Sotomayor (1985) have shown that in the Gale-Shapley matching algorithm (1962), the proposed-to side W (referred to as women there) can strategically force the W-optimal stable matching as the M-optimal one by truncating their preference lists, each woman possibly blacklisting all but one man. As Gusfield and Irving have already noted in 1989, no results are known regarding achieving this feat by means other than such preference-list truncation, i.e. by also permuting preference lists. We answer Gusfield and Irving's open question by providing tight upper bounds on the amount of blacklists and their combined size, that are required by the women to force a given matching as the M-optimal stable matching, or, more generally, as the unique stable matching. Our results show that the coalition of all women can strategically force any matching as the unique stable matching, using preference lists in which at most half of the women have nonempty blacklists, and in which the average blacklist size is less than 1. This allows the women to manipulate the market in a manner that is far more inconspicuous, in a sense, than previously realized. When there are less women than men, we show that in the absence of blacklists for men, the women can force any matching as the unique stable matching without blacklisting anyone, while when there are more women than men, each to-be-unmatched woman may have to blacklist as many as all men. Together, these results shed light on the question of how much, if at all, do given preferences for one side a priori impose limitations on the set of stable matchings under various conditions. All of the results in this paper are constructive, providing efficient algorithms for calculating the desired strategies.