Hostname: page-component-586b7cd67f-vdxz6 Total loading time: 0 Render date: 2024-11-27T20:35:54.211Z Has data issue: false hasContentIssue false

The Constrained Instability of Majority Rule: Experiments on the Robustness of the Uncovered Set

Published online by Cambridge University Press:  14 September 2007

William T. Bianco
Affiliation:
Department of Political Science, Indiana University, Bloomington, IN 47405, e-mail: [email protected]
Michael S. Lynch
Affiliation:
Department of Political Science, University of Kansas, 504 Blake Hall, Lawrence, KS 66044, e-mail: [email protected]
Gary J. Miller
Affiliation:
Department of Political Science, Washington University in St. Louis, Campus Box 1063, One Brooking Drive, St. Louis, MO 63130, e-mail: [email protected]

Abstract

The uncovered set has frequently been proposed as a solution concept for majority rule settings. This paper tests this proposition using a new technique for estimating uncovered sets and a series of experiments, including five-player computer-mediated experiments and 35-player paper-format experiments. The results support the theoretic appeal of the uncovered set. Outcomes overwhelmingly lie in or near the uncovered set. Furthermore, when preferences shift, outcomes track the uncovered set. Although outcomes tend to occur within the uncovered set, they are not necessarily stable; majority dominance relationships still produce instability, albeit constrained by the uncovered set.

Type
Research Article
Copyright
Copyright © The Author 2007. Published by Oxford University Press on behalf of the Society for Political Methodology 

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

Footnotes

Authors' note: We thank Matthew M. Schneider for research assistance. We thank James Holloway, Tse-Min Lin, Jim Granato, Randall L. Calvert, Rick K. Wilson, faculty and students of the Juan March Institute, and reviewers of Political Analysis for their very helpful comments and suggestions.

References

Bianco, William T., Jeliazkov, Ivan, and Sened, Itai. 2004. The uncovered set and the limits of legislative action. Political Analysis 12: 256–76.Google Scholar
Bianco, William T., Lynch, Michael S., Miller, Gary J., and Sened, Itai. 2006. ‘A theory waiting to be discovered and used’: A reanalysis of canonical experiments on majority rule decision-making. Journal of Politics 68: 837–50.Google Scholar
Cox, Gary W. 1987. The uncovered set and the core. American Journal of Political Science 31: 408–22.Google Scholar
Cox, Gary W., and McCubbins, Mathew D. 2005. Setting the agenda: Responsible party government in the US House of Representatives. Cambridge: Cambridge University Press.Google Scholar
Epstein, David. 1998. Uncovering some subtleties of the uncovered set: Social choice theory and distributive politics. Social Choice and Welfare 15: 8193.Google Scholar
Feld, Scott L., Grofman, Bernard, Hartley, Richard, Kilgour, Marc, Miller, Nicholas R., and Noviello, Nicolas. 1987. The uncovered set in spatial voting games. Theory and Decision 23: 129–55.Google Scholar
Fiorina, Morris P., and Plott, Charles R. 1978. Committee decisions under majority rule: An experimental study. American Political Science Review 72: 575–98.CrossRefGoogle Scholar
Green, Donald P., and Shapiro, Ian. 1994. Pathologies of rational choice theory: A critique of applications in political science. New Haven: Yale University Press.Google Scholar
Hartley, Richard, and Marc Kilgour, D. 1987. The geometry of the uncovered set. Mathematical Social Sciences 14: 175–83.Google Scholar
Johnson, N. L., and Kotz, S. 1972. Distributions in statistics: Continuous multivariate distributions. New York: Wiley.Google Scholar
McKelvey, Richard D. 1976. Intransitivities in multidimensional voting models and some implications for agenda control. Journal of Economic Theory 12: 472–82.CrossRefGoogle Scholar
McKelvey, Richard D. 1979. General conditions for global intransitivities in formal voting models. Econometrica 47: 1085–112.Google Scholar
McKelvey, Richard D. 1986. Covering dominance and institution free properties of social choice. American Journal of Political Science 30: 283314.Google Scholar
McKelvey, Richard D., and Ordeshook, Peter C. 1983. Some experimental results that fail to support the competitive solution. Public Choice 40: 281–91.Google Scholar
McKelvey, Richard D., and Ordeshook, Peter C. 1990. A decade of experimental research in spatial models of elections and committees. In Advances in the spatial theory of voting, ed. Enelow, James M. and Hinich, Melvin J., 99144. Cambridge: Cambridge University Press.Google Scholar
McKelvey, Richard D., and Schofield, Norman. 1987. Generalized symmetry conditions at a core. Econometrica 55: 923–33.Google Scholar
McKelvey, Richard D., Ordeshook, Peter C., and Winer, Mark D. 1978. The competitive solution for N-person games without transferable utility, with an application to committee games. American Political Science Review 72: 599615.Google Scholar
Miller, Nicholas. 1980. A new solution set for tournament and majority voting. American Journal of Political Science 24: 6896.Google Scholar
Ordeshook, Peter C., and Schwartz, Thomas. 1987. Agendas and the control of political outcomes. American Political Science Review 81: 179200.Google Scholar
Penn, Elizabeth M. 2006. Alternatives definitions of the uncovered set and their implications. Social Choice and Welfare 27: 83–7.CrossRefGoogle Scholar
Riker, William H. 1980. Implications from the disequilibrium of majority rule for the study of institutions. American Political Science Review 74: 432–46.CrossRefGoogle Scholar
Schofield, Norman. 1978. Instability of simple dynamic games. Review of Economic Studies 45: 575–94.Google Scholar
Shepsle, Kenneth A. 1979. Institutional arrangements and equilibria in multidimensional voting models. American Journal of Political Science 23: 2759.Google Scholar
Shepsle, Kenneth A. 1986. Institutional equilibrium and equilibrium institutions. In Political science: The science of politics, ed. Weisberg, Herbert F., 5181. New York: Agathon Press.Google Scholar
Shepsle, Kenneth A., and Weingast, Barry R. 1984. Uncovered sets and sophisticated voting outcomes with implications for agenda institutions. American Journal of Political Science 28: 4974.Google Scholar
Tullock, Gordon. 1981. Why so much stability? Public Choice 37: 189202.CrossRefGoogle Scholar