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Journal of Statistical Computation and Simulation Volume 85, 2015 - Issue 13: Selected Papers from the 22nd International Workshop on Matrices and Statistics (IWMS-2013), 12-15 August 2013. Toronto, Canada
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Original Articles

Bayesian estimation with integrated nested Laplace approximation for binary logit mixed models

L. GrilliDepartment of Statistics, Informatics, Applications, University of Florence, Florence, Italy
,
S. MetelliDepartment of Mathematics, Imperial College London, London, UK
&
C. RampichiniDepartment of Statistics, Informatics, Applications, University of Florence, Florence, ItalyCorrespondence[email protected]
Pages 2718-2726 | Received 31 Mar 2014, Accepted 12 Jun 2014, Published online: 11 Jul 2014

References

  • Gelman A, Hill J. Data analysis using regression and multilevel/hierarchical models. New York: Cambridge University Press; 2007.
  • Snijders TAB, Bosker RJ. Multilevel analysis: an introduction to basic and advanced multilevel modelling. 2nd ed. London: Sage; 2011.
  • Demidenko E. Mixed models: theory and applications with R. 2nd ed. New York: Wiley; 2013.
  • Rabe-Hesketh S, Skrondal A. Maximum likelihood estimation of limited and discrete dependent variable models with nested random effects. J Econ. 2005;128:301–323. doi: 10.1016/j.jeconom.2004.08.017
  • Browne W, Draper D. A comparison of Bayesian and likelihood-based methods for fitting multilevel models. Bayesian Anal. 2006;1:473–550. doi: 10.1214/06-BA117
  • Rue H, Martino S, Chopin N. Approximate Bayesian inference for latent gaussian models using integrated nested laplace approximations (with discussion). J R Stat Soc Ser B. 2009;71:319–392. doi: 10.1111/j.1467-9868.2008.00700.x
  • Schrödle B, Held L. Spatio-temporal disease mapping using INLA. Environmetrics 2011;22:725–734. doi: 10.1002/env.1065
  • Taylor BM, Diggle PJ. INLA or MCMC? A tutorial and comparative evaluation for spatial prediction in log-Gaussian Cox processes, J Stat Comput Simul. 2014;84(10):2266–2284. doi: 10.1080/00949655.2013.788653
  • Fong Y, Rue H, Wakefield J. Bayesian inference for generalized linear mixed models. Biostatistics 2010;11:397–412. doi: 10.1093/biostatistics/kxp053
  • Breslow NE, Clayton DG. Approximate inference in generalized linear mixed models. J Am Stat Assoc. 1993;88:9–25.
  • Gelman A. Prior distributions for variance parameters in hierarchical models (Comment on Article by Browne and Draper). Bayesian Anal. 2006;1:515–534. doi: 10.1214/06-BA117A
  • Roos M, Held L. Sensitivity analysis in Bayesian generalized linear mixed models for binary data. Bayesian Anal. 2011;6:259–278. doi: 10.1214/11-BA609
  • Roos M, Martins TG, Held L, Rue H. Sensitivity analysis for Bayesian hierarchical models; 2013. arXiv:1312.4797 [stat.ME]
  • Lunn D, Jackson C, Best N, Thomas A, Spiegelhalter D. The BUGS book: a practical introduction to Bayesian analysis. Boca Raton, FL: CRC Press/Chapman and Hall; 2012.
  • Austin PC. Estimating multilevel logistic regression models when the number of clusters is low: a comparison of different statistical software procedures. Int J Biostat. 2010;6(1), Article 16.
  • Rodríguez G, Goldman N. Improved estimation procedures for multilevel models with binary response: a case study. J R Stat Soc Ser A. 2001;164:339–355. doi: 10.1111/1467-985X.00206
  • Stegmueller D. How many countries for multilevel modeling? A comparison of frequentist and Bayesian approaches. Am J Political Sci. 2013;57:748–761. doi: 10.1111/ajps.12001
  • Moineddin R, Matheson F, Glazier R. A simulation study of sample size for multilevel logistic regression models. BMC Med Res Methodol. 2007;7:34. doi: 10.1186/1471-2288-7-34
  • Browne WJ, Goldstein H, Rasbash J. Multiple membership multiple classification (MMMC) models. Stat Model. 2001;1:103–124. doi: 10.1191/147108201128113

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