English

Determining Possible and Necessary Winners Given Partial Orders

Computer Science and Game Theory 2014-01-17 v1 Multiagent Systems

Abstract

Usually a voting rule requires agents to give their preferences as linear orders. However, in some cases it is impractical for an agent to give a linear order over all the alternatives. It has been suggested to let agents submit partial orders instead. Then, given a voting rule, a profile of partial orders, and an alternative (candidate) c, two important questions arise: first, is it still possible for c to win, and second, is c guaranteed to win? These are the possible winner and necessary winner problems, respectively. Each of these two problems is further divided into two sub-problems: determining whether c is a unique winner (that is, c is the only winner), or determining whether c is a co-winner (that is, c is in the set of winners). We consider the setting where the number of alternatives is unbounded and the votes are unweighted. We completely characterize the complexity of possible/necessary winner problems for the following common voting rules: a class of positional scoring rules (including Borda), Copeland, maximin, Bucklin, ranked pairs, voting trees, and plurality with runoff.

Keywords

Cite

@article{arxiv.1401.3876,
  title  = {Determining Possible and Necessary Winners Given Partial Orders},
  author = {Lirong Xia and Vincent Conitzer},
  journal= {arXiv preprint arXiv:1401.3876},
  year   = {2014}
}
R2 v1 2026-06-22T02:46:56.639Z