English

Approximately Stable Committee Selection

Computer Science and Game Theory 2020-04-28 v3 Discrete Mathematics

Abstract

In the committee selection problem, we are given mm candidates, and nn voters. Candidates can have different weights. A committee is a subset of candidates, and its weight is the sum of weights of its candidates. Each voter expresses an ordinal ranking over all possible committees. The only assumption we make on preferences is monotonicity: If SSS \subseteq S' are two committees, then any voter weakly prefers SS' to SS. We study a general notion of group fairness via stability: A committee of given total weight KK is stable if no coalition of voters can deviate and choose a committee of proportional weight, so that all these voters strictly prefer the new committee to the existing one. Extending this notion to approximation, for parameter c1c \ge 1, a committee SS of weight KK is said to be cc-approximately stable if for any other committee SS' of weight KK', the fraction of voters that strictly prefer SS' to SS is strictly less than cKK\frac{c K'}{K}. When c=1c = 1, this condition is equivalent to classical core stability. The question we ask is: Does a cc-approximately stable committee of weight at most any given value KK always exist for constant cc? It is relatively easy to show that there exist monotone preferences for which c2c \ge 2. However, even for simple and widely studied preference structures, a non-trivial upper bound on cc has been elusive. In this paper, we show that c=O(1)c = O(1) for all monotone preference structures. Our proof proceeds via showing an existence result for a randomized notion of stability, and iteratively rounding the resulting fractional solution.

Cite

@article{arxiv.1910.14008,
  title  = {Approximately Stable Committee Selection},
  author = {Zhihao Jiang and Kamesh Munagala and Kangning Wang},
  journal= {arXiv preprint arXiv:1910.14008},
  year   = {2020}
}

Comments

STOC 2020

R2 v1 2026-06-23T11:59:49.507Z