Winning in the Limit: Average-Case Committee Selection with Many Candidates

Abstract

We study the committee selection problem in the canonical impartial culture model with a large number of voters and an even larger candidate set. Here, each voter independently reports a uniformly random preference order over the candidates. For a fixed committee size k, we ask when a committee can collectively beat every candidate outside the committee by a prescribed majority level α. We focus on two natural notions of collective dominance, α-winning and α-dominating sets, and we identify sharp threshold phenomena for both of them using probabilistic methods, duality arguments, and rounding techniques. We first consider α-winning sets. A set S of k candidates is α-winning if, for every outside candidate a S, at least an α-fraction of voters rank some member of S above a. We show a sharp threshold at \[ αwin = 1 - 1k. \] Specifically, an α-winning set of size k exists with high probability when α < αwin, and is unlikely to exist when α > αwin. We then study the stronger notion of α-dominating sets. A set S of k candidates is α-dominating if, for every outside candidate a S, there exists a single committee member b ∈ S such that at least an α-fraction of voters prefer b to a. Here we establish an analogous sharp threshold at \[ αdom = 12 - 12k. \] As a corollary, our analysis yields an impossibility result for α-dominating sets: for every k and every α > αdom = 1 / 2 - 1 / (2k), there exist preference profiles that admit no α-dominating set of size k. This corollary improves the best previously known bounds for all k ≥ 2.