• DocumentCode
    640057
  • Title

    Information-theoretic study of voting systems

  • Author

    Yaakobi, Eitan ; Langberg, Michael ; Bruck, Jehoshua

  • Author_Institution
    Electr. Eng. Dept., California Inst. of Technol., Pasadena, CA, USA
  • fYear
    2013
  • fDate
    7-12 July 2013
  • Firstpage
    1087
  • Lastpage
    1091
  • Abstract
    The typical paradigm in voting theory involves n voters and m candidates. Every voter ranks the candidates resulting in a permutation of the m candidates. A key problem is to derive the aggregate result of the voting. A popular method for vote aggregation is based on the Condorcet criterion. The Condorcet winner is the candidate who wins every other candidate by pairwise majority. However, the main disadvantage of this approach, known as the Condorcet paradox, is that such a winner does not necessarily exist since this criterion does not admit transitivity. This paradox is mathematically likely (if voters assign rankings uniformly at random, then with probability approaching one with the number of candidates, there will not be a Condorcet winner), however, in real life scenarios such as elections, it is not likely to encounter the Condorcet paradox. In this paper we attempt to improve our intuition regarding the gap between the mathematics and reality of voting systems. We study a special case where there is global intransitivity between all candidates. We introduce tools from information theory and derive an entropy-based characterization of global intransitivity. In addition, we tighten this characterization by assuming that votes tend to be similar; in particular they can be modeled as permutations that are confined to a sphere defined by the Kendalls τ distance.
  • Keywords
    entropy; government; politics; Condorcet criterion; Condorcet paradox; Condorcet winner; Kendalls τ distance; entropy-based characterization; global intransitivity; information theory; mathematics; pairwise majority; permutation; vote aggregation; voting systems; voting theory; Aggregates; Context; Educational institutions; Entropy; Information theory; Mathematics; Web search;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Information Theory Proceedings (ISIT), 2013 IEEE International Symposium on
  • Conference_Location
    Istanbul
  • ISSN
    2157-8095
  • Type

    conf

  • DOI
    10.1109/ISIT.2013.6620394
  • Filename
    6620394