English

Metric distortion Under Probabilistic Voting

Computer Science and Game Theory 2025-02-14 v4

Abstract

Metric distortion in social choice is a framework for evaluating how well voting rules minimize social cost when both voters and candidates exist in a shared metric space, with a voter's cost defined by their distance to a candidate. Voters submit rankings, and the rule aggregates these rankings to determine a winner. We extend this framework to incorporate probabilistic voting, recognizing that real-world voters exhibit randomness in how they vote. Our extension includes various probability functions, notably the widely studied Plackett-Luce (PL) model. We show that the distortion results under probabilistic voting better correspond with conventional intuitions regarding popular voting rules such as \textsc{Plurality}, \textsc{Copeland}, \textsc{Random Dictator} and \textsc{Borda} than those under deterministic voting. For example, in the PL model with candidate strength inversely proportional to the square of their metric distance from a voter, we show that \textsc{Copeland}'s distortion is at most 2, whereas that of \textsc{RandomDictator} is Ω(m)\Omega(\sqrt{m}) in large elections (i.e., number of voters nn \rightarrow \infty), where mm is the number of candidates. This contrasts sharply with the classical model, where \textsc{RandomDictator} beats \textsc{Copeland} with a distortion of 3 versus 5. In the PL model where the candidate strength is inversely proportional to the distance raised to power θ\theta, the distortion under \textsc{Borda} is Θ(m12/θ)\Theta(m^{1-2/\theta}) when θ>2\theta>2 and Θ(1)\Theta(1) otherwise. This generalizes the classical deterministic voting model where the distortion of \textsc{Borda} is 2m12m-1. The proof uses a novel variant of asymptotic duality where we choose the Lagrange multiplier via asymptotically maximizing the derivative of the objective function. Overall, our work opens a new frontier for analyzing voting rules.

Keywords

Cite

@article{arxiv.2405.14223,
  title  = {Metric distortion Under Probabilistic Voting},
  author = {Mohak Goyal and Sahasrajit Sarmasarkar},
  journal= {arXiv preprint arXiv:2405.14223},
  year   = {2025}
}
R2 v1 2026-06-28T16:36:41.964Z