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Fast Estimation of Ideal Points with Massive Data

Published online by Cambridge University Press:  28 December 2016

KOSUKE IMAI*
Affiliation:
Princeton University
JAMES LO*
Affiliation:
University of Southern California
JONATHAN OLMSTED*
Affiliation:
The NPD Group
*
Kosuke Imai is Professor, Department of Politics and Center for Statistics and Machine Learning, Princeton University, Princeton, NJ 08544. Phone: 609-258-6601 ([email protected]), URL: http://imai.princeton.edu.
James Lo is Assistant Professor, Department of Political Science, University of Southern California, Los Angeles, CA 90089 ([email protected]).
Jonathan Olmsted is Solutions Manager, NPD Group, Port Washington, NY 11050 ([email protected]).

Abstract

Estimation of ideological positions among voters, legislators, and other actors is central to many subfields of political science. Recent applications include large data sets of various types including roll calls, surveys, and textual and social media data. To overcome the resulting computational challenges, we propose fast estimation methods for ideal points with massive data. We derive the expectation-maximization (EM) algorithms to estimate the standard ideal point model with binary, ordinal, and continuous outcome variables. We then extend this methodology to dynamic and hierarchical ideal point models by developing variational EM algorithms for approximate inference. We demonstrate the computational efficiency and scalability of our methodology through a variety of real and simulated data. In cases where a standard Markov chain Monte Carlo algorithm would require several days to compute ideal points, the proposed algorithm can produce essentially identical estimates within minutes. Open-source software is available for implementing the proposed methods.

Type
Research Article
Copyright
Copyright © American Political Science Association 2016 

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References

REFERENCES

Bafumi, Joseph, Gelman, Andrew, Park, David K., and Kaplan, Noah. 2005. “Practical Issues in Implementing and Understanding Bayesian Ideal Point Estimation.” Political Analysis 13: 171–87.CrossRefGoogle Scholar
Bafumi, Joseph, and Herron, Michael. 2010. “Leapfrog Representation and Extremism: A Study of American Voters and Their Members in Congress.” American Political Science Review 104: 519–42.Google Scholar
Bailey, Michael. 2007. “Comparable Preferences across Time and Institutions for the Court, Congress, and Presidency.” American Journal of Political Science 51: 433–48.Google Scholar
Bailey, Michael A. 2013. “Is Today’s Court the Most Conservative in Sixty Years? Challenges and Opportunities in Measuring Judicial Preferences.” Journal of Politics 75: 821–34.CrossRefGoogle Scholar
Bailey, Michael, and Chang, Kelly H.. 2001. “Comparing Presidents, Senators, and Justices: Interinstitutional Preference Estimation.” The Journal of Law, Economics, and Organization 17: 477506.Google Scholar
Bailey, Michael A., Kamoie, Brian, and Maltzman, Forrest. 2005. “Signals from the Tenth Justice: The Political Role of the Solicitor General in the Supreme Court Decision Making.” American Journal of Political Science 49: 7285.CrossRefGoogle Scholar
Bailey, Michael A., Strezhnev, Anton, and Voeten, Erik. 2015. “Estimating Dynamic State Preferences from United Nations Voting Data.” Journal of Conflict Resolution.Google Scholar
Barberá, Pablo. 2015. “Birds of the Same Feather Tweet Together: Bayesian Ideal Point Estimation Using Twitter Data.” Political Analysis 23: 7691.CrossRefGoogle Scholar
Battista, James Coleman, Peress, Michael, and Richman, Jesse. 2013. “Common-Space IdealPoints, Committee Assignments, and Financial Interests in the State Legislatures.” State Politics & Policy Quarterly 13: 7087.Google Scholar
Bock, R. Darrell, and Aitkin, Murray. 1981. “Marginal Maximum Likelihood Estimation of Item Parameters: Application of an EM Algorithm.” Psychometrika 46: 443–59.CrossRefGoogle Scholar
Bond, Robert, and Messing, Solomon. 2015. “Quantifying Social Medias Political Space: Estimating Ideology from Publicly Revealed Preferences on Facebook.” American Political Science Review 109: 6278.Google Scholar
Bonica, Adam. 2013. “Ideology and Interests in the Political Marketplace.” American Journal of Political Science 57: 294311.CrossRefGoogle Scholar
Bonica, Adam. 2014. “Mapping the Ideological Marketplace.” American Journal of Political Science 58: 367–87.Google Scholar
Carroll, Royce, Lewis, Jeffrey B., Lo, James, and Poole, Keith T.. 2009. “Measuring Bias and Uncertainty in DW-NOMINATE Ideal Point Estimates via the Parametric Bootstrap.” Political Analysis 17: 261–75.Google Scholar
Carroll, Royce, Lewis, Jeffrey B., Lo, James, Poole, Keith T., and Rosenthal, Howard. 2009. “Comparing NOMINATE and IDEAL: Points of difference and Monte Carlo tests.” Legislative Studies Quarterly 34: 555–91.CrossRefGoogle Scholar
Carroll, Royce, Lewis, Jeffrey B., Lo, James, Poole, Keith T., and Rosenthal, Howard. 2013. “The Structure of Utility in Spatial Models of Voting.” American Journal of Political Science 57: 1008–28.Google Scholar
Clark, Tom S., and Lauderdale, Benjamin. 2010. “Locating Supreme Court Opinions in Doctrine Space.” American Journal of Political Science 54: 871–90.Google Scholar
Clinton, Joshua D., Bertelli, Anthony, Grose, Christian R., Lewis, David E., and Nixon, David C.. 2012. “Separated Powers in the United States: The Ideology of Agencies, Presidents, and Congress.” American Journal of Political Science 56: 341–54.CrossRefGoogle Scholar
Clinton, Joshua, Jackman, Simon, and Rivers, Douglas. 2004. “The Statistical Analysis of Roll Call Data.” American Political Science Review 98: 355–70.CrossRefGoogle Scholar
Clinton, Joshua D., and Lewis, David E.. 2008. “Expert Opinion, Agency Characteristics, and Agency Preferences.” Political Analysis 16: 320.Google Scholar
Clinton, Joshua D., and Meirowitz, Adam. 2003. “Integrating Voting Theory andRoll Call Analysis: A Framework.” Political Analysis 11: 381–96.Google Scholar
Dempster, Arthur P., Laird, Nan M., and Rubin, Donald B.. 1977. “Maximum Likelihood from Incomplete Data Via the EM Algorithm (with Discussion).” Journal of the Royal Statistical Society, Series B, Methodological 39: 137.Google Scholar
Gelman, Andrew. 2006. “Prior Distributions for Variance Parameters in Hierarchical Models.” Bayesian Analysis 1: 515–33.Google Scholar
Gerber, Elisabeth R., and Lewis, Jeffrey B.. 2004. “Beyond the Median: Voter Preferences, District Heterogeneity, and Political Representation.” Journal of Political Economy 112: 1364–83.Google Scholar
Gerrish, Sean M., and Blei, David M.. 2012. “How They Vote: Issue-Adjusted Models of Legislative Behavior.” Advances in Neural Information Processing Systems 25: 2762–70.Google Scholar
Grimmer, Justin. 2011. “An Introduction to Bayesian Inference via Variational Approximations.” Political Analysis 19: 3247.Google Scholar
Hirano, Shigeo, Imai, Kosuke, Shiraito, Yuki, and Taniguchi, Masaaki. 2011. “Policy Positions in Mixed Member Electoral Systems:Evidence from Japan.” Working Paper available at http://imai.princeton.edu/research/japan.html.Google Scholar
Hix, Simon, Noury, Abdul, and Roland, Gérard. 2006. “Dimensions of Politics in the European Parliament.” American Journal of Political Science 50: 494511.Google Scholar
Ho, Daniel E., and Quinn, Kevin M.. 2010. “Did a Switch in Time Save Nine?Journal of Legal Analysis 2: 145.Google Scholar
Imai, Kosuke, Lo, James, and Olmsted, Jonathan. 2015. “emIRT: EM Algorithms for Estimating Item Response Theory Models.” available at the Comprehensive R Archive Network (CRAN). http://CRAN.R-project.org/package=list.Google Scholar
Imai, Kosuke, Lo, James, and Olmsted, Jonathan. 2016. “Replication data for: Fast Estimation of Ideal Points with Massive Data.” doi:10.7910/DVN/HAU0EX. The Dataverse Network.Google Scholar
Jackman, Simon. 2001. “Multidimensional Analysis of Roll Call Data via Bayesian Simulation: Identification, Estimation, Inference, and Model Checking.” Political Analysis 9: 227–41.Google Scholar
Jackman, Simon. 2012. pscl: Classes and Methods for R Developed in the Political Science Computational Laboratory, Stanford University. Department of Political Science, Stanford University, Stanford, California: Stanford University. R package version 1.04.4.Google Scholar
Kim, In Song, Londregan, John, and Ratkovic, Marc. 2014. Voting, Speechmaking, and the Dimensions of Conflict in the US Senate. Technical Report. Department of Politics, Princeton University.Google Scholar
Lauderdale, Benjamin E., and Herzog, Alexander. 2014. Measuring Political Positions from Legislative. Technical Report. London School of Economics and Political Science.Google Scholar
Lewandowski, Jirka, Merz, Nicolas, Regel, Sven, and Lehmann, Pola. 2015. manifestoR: Access and Process Data and Documents of the Manifesto Project. R package version 1.1-1. http://CRAN.R-project.org/package=manifestoR Google Scholar
Lewis, Jeffrey B., and Poole, Keith T.. 2004. “Measuring Bias and Uncertainty in Ideal Point Estimates via the Parametric Boostrap.” Political Analysis 12 (2): 105–27.CrossRefGoogle Scholar
Londregan, John B. 1999. “Estimating Legislators’ Preferred Points.” Political Analysis 8: 3556.Google Scholar
Londregan, John B. 2007. Legislative Institutions and Ideology in Chile. Cambridge, England: Cambridge University Press.Google Scholar
Lowe, Will, Benoit, Kenneth, Mikhaylov, Slava, and Laver, Michael. 2011. “Scaling Policy Preferences from Coded Political Texts.” Legislative Studies Quarterly 36: 123–55.Google Scholar
Martin, Andrew D., and Quinn, Kevin M.. 2002. “Dynamic Ideal Point Estimation via Markov chain Monte Carlo for the U.S. Supreme Court, 1953–1999.” Political Analysis 10: 134–53.CrossRefGoogle Scholar
Martin, Andrew D., Quinn, Kevin M., and Park, Jong Hee. 2013. MCMCpack: Markov chain Monte Carlo MCMC Package. http://cran.r-project.org/web/packages/MCMCpack Google Scholar
McCarty, Nolan, Poole, Keith T., and Rosenthal, Howard. 2006. Polarized America: The Dance of Ideology and Unequal Riches. Cambridge, MA: MIT Press.Google Scholar
Morgenstern, Scott. 2004. Patterns of Legislative Politics: Roll-Call Voting in Latin America and the United States. Cambridge, England: Cambridge University Press.Google Scholar
Poole, Keith T. 2000. “Nonparametric Unfolding of Binary Choice Data.” Political Analysis 8: 211–37.Google Scholar
Poole, Keith, Lewis, Jeffrey, Lo, James, and Carroll, Royce. 2011. “Scaling Roll Call Votes with wnominate in R.” Journal of Statistical Software 42: 121. http://www.jstatsoft.org/v42/i14/ Google Scholar
Poole, Keith, Lewis, Jeffrey, Lo, James, and Carroll, Royce. 2012. oc: OC Roll Call Analysis Software. R package version 0.93. http://CRAN.R-project.org/package=oc Google Scholar
Poole, Keith T., and Rosenthal, Howard. 1997. Congress: A Political Economic History of Roll Call Voting. New York: Oxford University Press.Google Scholar
Poole, Keither T., and Rosenthal, Howard. 1991. “Patterns of Congressional Voting.” American Journal of Political Science 35: 228–78.Google Scholar
Proksch, Sven-Oliver, and Slapin, Jonathan B.. 2010. “Position Taking in European Parliament Speeches.” British Journal of Political Science 40: 587611.Google Scholar
Quinn, Kevin M. 2004. “Bayesian Factor Analysis for Mixed Ordinal and Continuous Responses.” Political Analysis 12: 338–53.Google Scholar
Rosas, Guillermo, and Shomer, Yael. 2008. “Models of Nonresponse in Legislative Politics.” Legislative Studies Quarterly 33: 573601.CrossRefGoogle Scholar
Shor, Boris, Berry, Christopher, and McCarty, Nolan. 2011. “A Bridge to Somewhere: Mapping State and Congressional Ideology on a Cross-institutional Common Space.” Legislative Studies Quarterly 35: 417–48.Google Scholar
Shor, Boris, and McCarty, Nolan. 2011. “The Ideological Mapping of American Legislatures.” American Political Science Review 105: 530–51.Google Scholar
Slapin, Jonathan B., and Proksch, Sven-Oliver. 2008. “A Scaling Model for Estimating Time-Series Party Positions from Texts.” American Journal of Political Science 52: 705–22.Google Scholar
Spirling, Arthur, and McLean, Iain. 2007. “UK OC OK? Interpreting Optimal Classification Scores for the U.K. House of Commons.” Political Analysis 15: 8596.CrossRefGoogle Scholar
Tausanovitch, Chris, and Warshaw, Christopher. 2013. “Measuring Constituent Policy Preferences in Congress, State Legislatures, and Cities.” Journal of Politics 75: 330–42.Google Scholar
Voeten, Erik. 2000. “Clashes in the Assembly.” International Organization 54: 185215.Google Scholar
Wainwright, Martin J., and Jordan, Michael I.. 2008. “Graphical Models, Exponential Families, and Variational Inference.” Foundations and Trends in Machine Learning 1: 1310.Google Scholar
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