Hostname: page-component-848d4c4894-p2v8j Total loading time: 0 Render date: 2024-05-01T15:36:02.130Z Has data issue: false hasContentIssue false
  • English
  • Français

Inferring Transition Probabilities from Repeated Cross Sections

Published online by Cambridge University Press:  04 January 2017

Ben Pelzer ,
Rob Eisinga  and
Philip Hans Franses
Ben Pelzer
Affiliation:
Research Technical Department, University of Nijmegen, P.O. Box 9104, 6500 HE Nijmegen, The Netherlands. e-mail: b.pelzer@maw.kun.nl
Rob Eisinga
Affiliation:
Department of Social Science Research Methods, University of Nijmegen, P.O. Box 9104, 6500 HE Nijmegen, The Netherlands. e-mail: r.eisinga@maw.kun.nl
Philip Hans Franses
Affiliation:
Econometric Institute, Erasmus University Rotterdam, P.O. Box 1738, 3000 DR Rotterdam, The Netherlands. e-mail: franses@few.eur.nl
Get access Rights & Permissions [Opens in a new window]

Abstract

This paper discusses a nonstationary, heterogeneous Markov model designed to estimate entry and exit transition probabilities at the micro level from a time series of independent cross-sectional samples with a binary outcome variable. The model has its origins in the work of Moffitt and shares features with standard statistical methods for ecological inference. We outline the methodological framework proposed by Moffitt and present several extensions of the model to increase its potential application in a wider array of research contexts. We also discuss the relationship with previous lines of related research in political science. The example illustration uses survey data on American presidential vote intentions from a five-wave panel study conducted by Patterson in 1976. We treat the panel data as independent cross sections and compare the estimates of the Markov model with both dynamic panel parameter estimates and the actual observations in the panel. The results suggest that the proposed model provides a useful framework for the analysis of transitions in repeated cross sections. Open problems requiring further study are discussed.

Type
Articles
Information
Political Analysis , Volume 10 , Issue 2 , Spring 2002 , pp. 113 - 133
Copyright
Copyright © Political Methodology Section of the American Political Science Association 2002 

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.)

References

Achen, Christopher H., and Phillips Shively, W. 1995. Cross-Level Inference. Chicago: University of Chicago Press.Google Scholar
Amemiya, Takeshi. 1981. “Qualitative Response Models: A Survey.” Journal of Econometric Literature 19:14831536.Google Scholar
Amemiya, Takeshi. 1985. Advanced Econometrics. Oxford: Basil Blackwell.Google Scholar
Andersen, E. B. 1980. Discrete Statistical Models with Social Science Applications. Amsterdam: North-Holland.Google Scholar
Bartholomew, David J. 1996. The Statistical Approach to Social Measurement. San Diego, CA: Academic Press.Google Scholar
Bishop, Yvonne M.M., Fienberg, Stephen E., and Holland, Paul W. 1975. Discrete Multivariate Analysis: Theory and Practice. Cambridge, MA: MIT Press.Google Scholar
Chambers, R. L., and Steel, D. G. 2001. “Simple Methods for Ecological Inference in 2 × 2 Tables.” Journal of the Royal Statistical Society. Series A 164:175192.Google Scholar
Collett, D. 1991. Modelling Binary Data. London: Chapman and Hall.Google Scholar
Cook, Richard J., and Ng, Edmund T. M. 1997. “A Logistic-Bivariate Normal Model for Overdispersed Two-State Markov Processes.” Biometrics 53:358364.Google Scholar
Davies Withers, Suzanne. 2001. “Quantitative Methods: Advancement in Ecological Inference.” Progress in Human Geography 25:8796.Google Scholar
Diggle, Peter J., Liang, Kung-Yee, and Zeger, Scott L. 1994. Analysis of Longitudinal Data. Oxford: Clarendon Press.Google Scholar
Duncan, Otis Dudley, and Davis, Beverly. 1953. “An Alternative to Ecological Correlation.” American Sociological Review 18:665666.Google Scholar
Felteau, Claude, Lefebvre, Philip Merrigan, Pierre, and Brouillette, Liliane. 1997. Conjugalité et Fécondité des Femmes Canadiennes: Un Modèle Dynamique Estimé à l'aide d'une Série de Coupes Transversales. Montreal: CREFÉ, Université de Québec à Montréal.Google Scholar
Firth, David. 1982. Estimation of Voter Transition Matrices from Election Data. . London: Department of Mathematics, Imperial College London.Google Scholar
Franklin, Charles H. 1989. “Estimation across Data Sets: Two-Stage Auxiliary Instrumental Variables Estimation (2SAIV).” Political Analysis 1:123.Google Scholar
Goodman, Leo A. 1953. “Ecological Regressions and the Behavior of Individuals.” American Sociological Review 18:663666.Google Scholar
Goodman, Leo A. 1961. “Statistical Methods for the Mover-Stayer Model.” Journal of the American Statistical Association 56:841868.Google Scholar
Hamerle, Alfred, and Ronning, Gerd. 1995. Panel Analysis for Qualitative Variables. In Handbook of Statistical Modeling for the Social and Behavioral Sciences, eds. Arminger, Gerhard, Clogg, Clifford, and Sobel, Michael E. New York: Plenum Press, pp. 401451.Google Scholar
Hawkins, D. L., and Han, C. P. 2000. “Estimating Transition Probabilities from Aggregate Samples Plus Partial Transition Data.” Biometrics 56:848854.Google Scholar
Heckman, James J. 1981. Statistical Models for Discrete Panel Data. In Structural Analysis of Discrete Data with Econometric Applications, eds. Manski, Charles F. and McFadden, Daniel. Cambridge MA: MIT Press, pp. 114178.Google Scholar
Heckman, James J., and Robb, Richard Jr. 1985. “Alternative Methods for Evaluating the Impact of Interventions: An Overview.” Journal of Econometrics 30:239267.Google Scholar
Kalbfleish, J. D., and Lawless, J. F. 1984. “Least Squares Estimation of Transition Probabilities from Aggregate Data.” Canadian Journal of Statistics 12:169182.Google Scholar
Kalbfleish, J. D., and Lawless, J. F. 1985. “The Analysis of Panel Data under a Markovian Assumption.” Journal of the American Statistical Association 80:863871.Google Scholar
King, Gary. 1997. A Solution to the Ecological Inference Problem: Reconstructing Individual Behavior from Aggregate Data. Cambridge: Cambridge University Press.Google Scholar
King, Gary, Rosen, Ori, and Tanner, Martin. 1999. “Binomial-Beta Hierarchical Models for Ecological Inference.” Sociological Methods and Research 28:6190.Google Scholar
Lawless, J. F., and McLeish, D. L. 1984. “The Information in Aggregate Data from Markov Chains.” Biometrika 71:419430.Google Scholar
Lee, T. C., Judge, G. G., and Zellner, A. 1970. Estimating the Parameters of the Markov Probability Model from Aggregate Time Series Data. Amsterdam: North-Holland.Google Scholar
McCall, John J. 1971. “A Markovian Model of Income Dynamics.” Journal of the American Statistical Association 66:439447.Google Scholar
Mebane, Walter R., and Wand, Jonathan. 1997. “Markov Chain Models for Rolling Cross-Section Data: How Campaign Events and Political Awareness Affect Vote Intentions and Partisanship in the United States and Canada.” Paper presented at the 1997 Annual Meeting of the Midwest Political Science Association, Chicago, IL.Google Scholar
Moffitt, Robert. 1990. “The Effect of the U.S. Welfare System on Marital Status.” Journal of Public Economics 41:101124.Google Scholar
Moffitt, Robert. 1993. “Identification and Estimation of Dynamic Models with a Time Series of Repeated Cross-Sections.” Journal of Econometrics 59:99123.Google Scholar
Morgan, B. J. T. 1992. Analysis of Quantal Response Data. London: Chapman and Hall.Google Scholar
Patterson, Thomas E. 1980. The Mass Media Election: How Americans Choose Their President. New York: Praeger.Google Scholar
Pelzer, Ben, and Eisinga, Rob. 2002. “Bayesian Estimation of Transition Probabilities from Repeated Cross Sections.” Statistica Neerlandica 56:2333.Google Scholar
Pelzer, Ben, Eisinga, Rob, and Franses, Philip H. 2001. “Estimating Transition Probabilities from a Time Series of Repeated Cross Sections.” Statistica Neerlandica 55:248261.CrossRefGoogle Scholar
Penubarti, Mohan, and Schuessler, Alexander A. 1998. Inferring Micro- from Macrolevel Change: Ecological Panel Inference in Surveys. Los Angeles: University of California.Google Scholar
Rosen, Ori, Jiang, Gary King, Wenxin, and Tanner, Martin. 2001. “Bayesian and Frequentist Inference for Ecological Inference: The R × C Case.” Statistica Neerlandica 55:133155.Google Scholar
Ross, Sheldon M. 1993. Introduction to Probability Models (5th ed.). San Diego, CA: Academic Press.Google Scholar
Shively, W. Phillips. 1991. “A General Extension of the Methods of Bounds, with Special Application to Studies of Electoral Transition.” Historical Methods 24:8194.Google Scholar
Sigelman, Lee. 1991. “Turning Cross Sections into a Panel: A Simple Procedure for Ecological Inference.” Social Science Research 20:150170.Google Scholar
Snijders, Tom, and Bosker, Roel. 1999. Multilevel Analysis. An Introduction to Basic and Advanced Multilevel Modeling. London: Sage.Google Scholar
Stott, David. 1997. SABRE 3.0: Software for the Analysis of Binary Recurrent Events. http://www.cas.lancs.ac.uk:80/software/(Dec. 2001).Google Scholar
Stroud, A. H., and Secrest, Don. 1966. Gaussian Quadrature Formulas. Englewood Cliffs, NJ: Prentice-Hall.Google Scholar
Topel, Robert H. 1983. “On Layoffs and Unemployment Insurance.” American Economic Review 73:541559.Google Scholar
Supplementary material: File

Pelzer et al. supplementary material

Supplementary Material

Download Pelzer et al. supplementary material(File)
File 886.5 KB