An impossibility result for strongly group-strategyproof multi-winner approval-based voting
Abstract
Multi-winner approval-based voting has received considerable attention recently. A voting rule in this setting takes as input ballots in which each agent approves a subset of the available alternatives and outputs a committee of alternatives of given size . We consider the scenario when a coalition of agents can act strategically and alter their ballots so that the new outcome is strictly better for a coalition member and at least as good for anyone else in the coalition. Voting rules that are robust against this strategic behaviour are called strongly group-strategyproof. We prove that, for , strongly group-strategyproof multi-winner approval-based voting rules which furthermore satisfy the minimum efficiency requirement of unanimity do not exist, where is the number of available alternatives. Our proof builds a connection to single-winner voting with ranking-based ballots and exploits the infamous Gibbard-Satterthwaite theorem to reach the desired impossibility result. Our result has implications for paradigmatic problems from the area of approximate mechanism design without money and indicates that strongly group-strategyproof mechanisms for minimax approval voting, variants of facility location, and classification can only have an unbounded approximation ratio.
Cite
@article{arxiv.2402.08746,
title = {An impossibility result for strongly group-strategyproof multi-winner approval-based voting},
author = {Ioannis Caragiannis and Rob LeGrand and Evangelos Markakis and Emmanouil Pountourakis},
journal= {arXiv preprint arXiv:2402.08746},
year = {2024}
}
Comments
16 pages, 1 table