Advanced search
Publication Cover
Structural Equation Modeling: A Multidisciplinary Journal Volume 24, 2017 - Issue 2: Novel Approaches in Mixture Modeling
Submit an article Journal homepage
1,198
Views
22
CrossRef citations to date
0
Altmetric
Articles

Using Bayesian Statistics to Model Uncertainty in Mixture Models: A Sensitivity Analysis of Priors

Sarah DepaoliUniversity of California, MercedCorrespondence[email protected]
,
Yuzhu YangUniversity of California, Merced
&
John FeltUniversity of California, Merced
Pages 198-215 | Published online: 16 Dec 2016

REFERENCES

  • Asparouhov, T., & Muthén, B. O. (2010). Bayesian analysis using Mplus. Los Angeles, CA: Muthén and Muthén.
  • Baldwin, S. A., & Fellingham, G. W. (2013). Bayesian methods for the analysis of small sample multilevel data with a complex variance structure. Psychological Methods, 18, 151–164. doi:10.1037/a0030642
  • Bauer, D. J. (2007). Observations on the use of growth mixture models in psychological research. Multivariate Behavioral Research, 42, 757–786. doi:10.1080/00273170701710338
  • Berger, J. (1990). Robust Bayesian analysis: Sensitivity to the prior. Journal of Statistical Planning and Inference, 25, 303–328. doi:10.1016/0378-3758(90)90079-A
  • Berger, J. (2006). The case for objective Bayesian analysis. Bayesian Analysis, 3, 385–402.
  • Bijak, J., & Wisniowski, A. (2010). Bayesian forecasting of immigration to selected European countries by using expert knowledge. Journal of the Royal Statistical Society: Series A (Statistics in Society), 173, 775–796. doi:10.1111/j.1467-985X.2009.00635.x
  • Bollen, K. A., & Curran, P. J. (2006). Latent curve models: A structural equation approach. Hoboken, NJ: Wiley.
  • Bornn, L., Doucet, A., & Gottardo, R. (2010). An efficient computational approach for prior sensitivity analysis and cross-validation. The Canadian Journal of Statistics, 38, 47–64.
  • Brown, L. D. (2008). In-season prediction of batting averages: A field test of empirical Bayes and Bayes methodologies. The Annals of Applied Statistics, 2, 113–152. doi:10.1214/07-AOAS138
  • Candel, J. J. M., & Winkens, B. (2003). Performance of empirical Bayes estimators of level-2 random parameters in multilevel analysis: A Monte Carlo study for longitudinal designs. Journal of Educational and Behavioral Statistics, 28, 169–194. doi:10.3102/10769986028002169
  • Celeux, G., Forbers, F., Robert, C., & Titterington, D. (2006). Deviance information criteria for missing data models. Bayesian Analysis, 1, 651–674. doi:10.1214/06-BA122
  • Celeux, G., Hurn, M., & Robert, C. (2000). Computational and inferential difficulties with mixture posterior distributions. Journal of the American Statistical Association, 95, 957–970. doi:10.1080/01621459.2000.10474285
  • Chung, Y., Gelman, A., Rabe-Hesketh, S., Liu, J., & Dorie, V. (2015). Weakly informative prior for point estimation of covariance matrices in hierarchical models. Journal of Educational and Behavioral Statistics, 40, 136–157. doi:10.3102/1076998615570945
  • Depaoli, S. (2012). Measurement and structural model class separation in mixture CFA: ML/EM versus MCMC. Structural Equation Modeling, 19, 178–203. doi:10.1080/10705511.2012.659614
  • Depaoli, S. (2013). Mixture class recovery in GMM under varying degrees of class separation: Frequentist versus Bayesian estimation. Psychological Methods, 18, 186–219. doi:10.1037/a0031609
  • Depaoli, S., & Clifton, J. P. (2015). A Bayesian approach to multilevel structural equation modeling with continuous and dichotomous outcomes. Structural Equation Modeling, 22, 327–351. doi:10.1080/10705511.2014.937849
  • Depaoli, S., & van de Schoot, R. (2015). Improving transparency and replication in Bayesian statistics: The WAMBS-checklist. Psychological Methods. Advance online publication. doi:10.1037/met0000065
  • Depaoli, S., van de Schoot, R., van Loey, N., & Sijbrandij, M. (2015). Using Bayesian statistics for modeling PTSD through latent growth mixture modeling: Implementation and discussion. European Journal of Psychotraumatology, 6, 27516. doi:10.3402/ejpt.v6.27516
  • Dey, D. K., Ghosh, S. K., Lou, K.-R., & Verdinelli, I. (1996). On local sensitivity measures in Bayesian analysis [with discussion and rejoinder]. Bayesian Robustness, 29, 21–39.
  • Diebolt, J., & Robert, C. P. (1994). Estimation of finite mixture distributions through Bayesian sampling. Journal of the Royal Statistical Society: Series B (Methodological), 56, 363–375.
  • Dolan, C. V., Schmittmann, V. D., Lubke, G. H., & Neale, M. C. (2005). Regime switching in the latent growth curve model. Structural Equation Modeling, 12, 94–119. doi:10.1207/s15328007sem1201_5
  • Fransman, W., van Tongeren, M., Cherrie, J. W., Tischer, M., Schneider, T., Schinkel, J., … Tielemans, E. (2011). Advanced Reach Tool (ART): Development of the mechanistic model. Annals of Occupational Hygiene, 55, 957–979. doi:10.1093/annhyg/mer083
  • Frühwirth-Schnatter, S. (2001). Markov chain Monte Carlo estimation of classical and dynamic switching and mixture models. Journal of the American Statistical Association, 96, 194–209. doi:10.1198/016214501750333063
  • Frühwirth-Schnatter, S. (2010). Finite mixture and Markov switching models. New York, NY: Springer.
  • Gelman, A., Bois, F., & Jiang, J. (1996). Physiological pharmacokinetic analysis using population modeling and informative prior distributions. Journal of the American Statistical Association, 91, 1400–1412. doi:10.1080/01621459.1996.10476708
  • Gelman, A., Carlin, J. B., Stern, H. S., Dunson, D. B., Vehtari, A., & Rubin, D. B. (2013). Bayesian data analysis. New York, NY: Chapman & Hall/CRC.
  • Gelman, A., & Rubin, D. B. (1992). Inference from iterative simulation using multiple sequences. Statistical Science, 7, 457–472. doi:10.1214/ss/1177011136
  • Geman, S., & Geman, D. (1984). Stochastic relaxation, Gibbs distributions, and the Bayesian restoration of images. Pattern Analysis and Machine Intelligence, IEEE Transactions, 6, 721–741. doi:10.1109/TPAMI.1984.4767596
  • Ghosh, J. K., & Mukerjee, R. (1992). Non-informative priors (with discussion). In J. M. Bernardo, J. O. Berger, A. P. Dawid, & A. F. M. Smith (Eds.), Bayesian statistics (Vol. 4, pp. 195–210). Oxford, UK: Oxford University Press.
  • Gill, J. (2008). Bayesian methods: A social and behavioral sciences approach. Boca Raton, FL: CRC.
  • Grimm, K. J., & Ram, N. (2009). Nonlinear growth models in Mplus and SAS. Structural Equation Modeling, 16, 676–701. doi:10.1080/10705510903206055
  • Hipp, J. R., & Bauer, D. J. (2006). Local solutions in the estimation of growth mixture models. Psychological Methods, 11, 36–53. doi:10.1037/1082-989X.11.1.36
  • Howard, G. S., Maxwell, S. E., & Fleming, K. J. (2000). The proof of the pudding: An illustration of the relative strengths of null hypothesis, meta-analysis, and Bayesian analysis. Psychological Methods, 5, 315–332. doi:10.1037/1082-989X.5.3.315
  • Hox, J. J., van de Schoot, R., & Matthijsse, S. (2012). How few countries will do? Comparative survey analysis from a Bayesian perspective. Survey Research Methods, 6, 87–93.
  • Ibrahim, J. G., Chen, M. H., & Sinha, D. (2001). Bayesian survival analysis. New York, NY: Springer.
  • Jeffreys, H. (1961). Theory of probability (3rd ed.). Oxford, UK: Oxford University Press.
  • Kaplan, D. (2002). Methodological advances in the analysis of individual growth with relevance to education policy. Peabody Journal of Education, 77, 189–215. doi:10.1207/S15327930PJE7704_9
  • Kaplan, D., & Depaoli, S. (2012). Bayesian structural equation modeling. In R. Hoyle (Ed.), Handbook of structural equation modeling (pp. 650–673). New York, NY: Guilford.
  • Kass, R. E., Tierney, L., & Kadane, J. B. (1989). Approximate methods for assessing influence and sensitivity in Bayesian analysis. Biometrika, 76, 663–674. doi:10.1093/biomet/76.4.663
  • Kim, S.-Y., Suh, Y., Kim, J.-S., Albanese, M., & Langer, M. M. (2013). Single and multiple ability estimation in the SEM framework: A non-informative Bayesian estimation approach. Multivariate and Behavioral Research, 48, 563–591. doi:10.1080/00273171.2013.802647
  • Kruschke, J. K. (2015). Doing Bayesian analysis: A tutorial with R, Jags, and STAN. San Diego, CA: Academic.
  • Kruschke, J. K., & Meredith, M. (2015). Package ‘BEST’. Retrieved from https://cran.r-project.org/web/packages/BEST/BEST.pdf
  • Lambert, P. C., Sutton, A. J., Burton, P. R., Abrams, K. R., & Jones, D. R. (2005). How vague is vague? A simulation study of the impact of the use of vague prior distributions in MCMC using WinBUGS. Statistics in Medicine, 24, 2401–2428. doi:10.1002/(ISSN)1097-0258
  • Lee, S.-Y. (2007). Structural equation modeling: A Bayesian approach. Hoboken, NJ: Wiley.
  • Lee, S.-Y., & Song, X.-Y. (2012). Basic and advanced Bayesian structural equation modeling: With applications in the medical and behavioral sciences. Hoboken, NJ: Wiley.
  • Liu, H., Zhang, Z., & Grimm, K. J. (2016). Comparison of inverse Wishart and separation-strategy priors for Bayesian estimation of covariance parameter matrix in growth curve analysis. Structural Equation Modeling, 23, 354–367. doi:10.1080/10705511.2015.1057285
  • Lu, Z. L., Zhang, Z., & Lubke, G. (2011). Bayesian inference for growth mixture models with latent class dependent missing data. Multivariate Behavioral Research, 46, 567–597. doi:10.1080/00273171.2011.589261
  • MacCallum, R. C., Edwards, M. C., & Cai, L. (2012). Hopes and cautions in implementing Bayesian structural equation modeling. Psychological Methods, 17, 340–345. doi:10.1037/a0027131
  • Martin, T. G., Burgman, M. A., Fidler, F., Kuhnert, P. M., Low-Choy, S., Mcbride, M., & Mengersen, K. (2012). Eliciting expert knowledge in conservation Science. Conservation Biology, 26, 29–38. doi:10.1111/j.1523-1739.2011.01806.x
  • McCulloch, R. E. (1989). Local model influence. Journal of the American Statistical Association, 84, 473–478. doi:10.1080/01621459.1989.10478793
  • Moore, T. M., Reise, S. P., Depaoli, S., & Haviland, M. G. (2015). Iteration of partially specified target matrices: Applications in exploratory and Bayesian confirmatory factor analysis. Multivariate Behavioral Research, 50, 149–161. doi:10.1080/00273171.2014.973990
  • Morris, D. E., Oakley, J. E., & Crowe, J. A. (2014). A web-based tool for eliciting probability distributions from experts. Environmental Modelling & Software, 52, 1–4. doi:10.1016/j.envsoft.2013.10.010
  • Müller, U. K. (2012). Measuring prior sensitivity and prior informativeness in large Bayesian models. Journal of Monetary Economics, 59, 581–597. doi:10.1016/j.jmoneco.2012.09.003
  • Muthén, B. (2004). Latent variable analysis: Growth mixture modeling and related techniques for longitudinal data. In D. Kaplan (Ed.), Handbook of quantitative methodology for the social sciences (pp. 345–368). Newbury Park, CA: Sage.
  • Muthén, B., & Asparouhov, T. (2012). Bayesian structural equation modeling: A more flexible representation of substantive theory. Psychological Methods, 17, 313–335. doi:10.1037/a0026802
  • Muthén, B., & Shedden, K. (1999). Finite mixture modeling with mixture outcomes using the EM algorithm. Biometrics, 55, 463–469. doi:10.1111/j.0006-341X.1999.00463.x
  • Muthén, L., & Muthén, B. (1998–2015). Mplus user’s guide (7th ed.). Los Angeles, CA: Muthén & Muthén.
  • Natarajan, R., & McCulloch, C. E. (1998). Gibbs sampling with diffuse proper priors: A valid approach to data-driven inference? Journal of Computational and Graphical Statistics, 7, 267–277.
  • National Center for Education Statistics. (2001). Early childhood longitudinal study: Kindergarten class of 1998–99: Base year public-use data files user’s manual ( Tech. Rep. No. NCES 2001-029). Washington, DC: U.S. Government Printing Office.
  • Palardy, G., & Vermunt, J. K. (2010). Multilevel growth mixture models for classifying groups. Journal of Educational and Behavioral Statistics, 35, 532–565. doi:10.3102/1076998610376895
  • Plummer, M. (2015). JAGS Version 4.0 user manual. Retrieved from http://www.uvm.edu/~bbeckage/Teaching/DataAnalysis/Manuals/manual.jags.pdf
  • R Core Team. (2016). R: A language and environment for statistical computing. Vienna, Austria. Retrieved from https://www.r-project.org/
  • Ram, N., & Grimm, K. J. (2009). Growth mixture modeling: A method for identifying differences in longitudinal change among unobserved groups. International Journal of Behavioral Development, 33, 565–576. doi:10.1177/0165025409343765
  • Rietbergen, C., Klugkist, I., Janssen, K. J., Moons, K. G., & Hoijtink, H. J. (2011). Incorporation of historical data in the analysis of randomized therapeutic trials. Contemporary Clinical Trials, 32, 848–855. doi:10.1016/j.cct.2011.06.002
  • Rindskopf, D. (2012). Next steps in Bayesian structural equation models: Comments on, variations of, and extensions to Muthén and Asparouhov (2012). Psychological Methods, 17, 336–339. doi:10.1037/a0027130
  • Roos, M., Martins, T. G., Held, L., & Rue, H. (2015). Sensitivity analysis for Bayesian hierarchical models. Bayesian Analysis, 10, 321–349. doi:10.1214/14-BA909
  • Serang, S., Zhang, Z., Helm, J., Steele, J. S., & Grimm, K. J. (2015). Evaluation of a Bayesian approach to estimating nonlinear mixed-effects mixture models. Structural Equation Modeling, 22, 202–215. doi:10.1080/10705511.2014.937322
  • Tofighi, D., & Enders, C. K. (2008). Identifying the correct number of classes in growth mixture models. In G. R. Hancock & K. M. Samuelson (Eds.), Advances in latent variable mixture models (pp. 317–341). Charlotte, NC: Information Age.
  • Tolvanen, A. (2007). Latent growth mixture modeling: A simulation study (Unpublished doctoral dissertation). University of Jyvaskyla, Jyvaskyla, Finland.
  • Tueller, S., & Lubke, G. (2010). Evaluation of structural equation mixture models: Parameter estimates and correct class assignment. Structural Equation Modeling, 17, 165–192. doi:10.1080/10705511003659318
  • van de Schoot, R., Broere, J. J., Perryck, K., Zondervan-Zwijnenburg, M., & van Loey, N. (2015). Analyzing small data sets using Bayesian estimation: The case of posttraumatic stress symptoms following mechanical ventilation in burn survivors. European Journal of Psychotraumatology, 6. doi:10.3402/ejpt.v6.25216
  • van de Schoot, R., Winter, S., Zondervan-Zwijnenburg, M., Ryan, O., & Depaoli, S. (in press). A systematic review of Bayesian papers in psychology: The last 25 years. Psychological Methods.
  • van der Linden, W. J. (2008). Using response times for item selection in adaptive testing. Journal of Educational and Behavioral Statistics, 33, 5–20. doi:10.3102/1076998607302626
  • Yang, M., & Dunson, D. B. (2010). Bayesian semiparametric structural equation models with latent variables. Psychometrika, 75, 675–693. doi:10.1007/s11336-010-9174-4
  • Zhang, Z., Hamagami, F., Wang, L., Grimm, K., & Nesselroade, J. R. (2007). Bayesian analysis of longitudinal data using growth curve models. International Journal of Behavioral Development, 31, 374–383. doi:10.1177/0165025407077764
  • Zhang, Z., Lai, K., Lu, Z., & Tong, X. (2013). Bayesian inference and application of robust growth curve models using Student’s t distribution. Structural Equation Modeling, 20, 47–78. doi:10.1080/10705511.2013.742382
  • Zhu, H., Ibrahim, J. G., & Tang, N. (2011). Bayesian influence analysis: A geometric approach. Biometrika, 98, 307–323. doi:10.1093/biomet/asr009

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.