English

Condorcet Winner Probabilities - A Statistical Perspective

Statistics Theory 2007-06-13 v1 Statistics Theory

Abstract

A Condorcet voting scheme chooses a winning candidate as one who defeats all others in pairwise majority rule. We provide a review which includes the rigorous mathematical treatment for calculating the limiting probability of a Condorcet winner for any number of candidates and value of nn odd or even and with arbitrary ran k order probabilities, when the voters are independent. We provide a compact and complete Table for the limiting probability of a Condorcet winner with three candidates and arbitrary rank order probabilities. We present a simple proof of a result of May to show the limiting probability of a Condorcet winner tends to zero as the number of candidates tends to infinity. We show for the first time that the limiting probability of a Condorcet winner for any given number of candidates mm is monotone decreasing in mm for the equally likely case. This, in turn, settles the conjectures of Kelly and Buckley and Westen for the case nn \to \infty. We prove the validity of Gillett's conjecture on the minimum value of the probability of a Condorcet winner for m=3m=3 and any nn. We generalize this result for any mm and nn and obtain the minimum solution and the minimum probability of a Condorcet winner.

Keywords

Cite

@article{arxiv.math/0511140,
  title  = {Condorcet Winner Probabilities - A Statistical Perspective},
  author = {M. S. Krishnamoorthy and M. Raghavachari},
  journal= {arXiv preprint arXiv:math/0511140},
  year   = {2007}
}

Comments

27 pages 1 figure