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Semiparametric Bayesian measurement error modeling

Author

Listed:
  • Casanova, María P.
  • Iglesias, Pilar
  • Bolfarine, Heleno
  • Salinas, Victor H.
  • Peña, Alexis

Abstract

This work presents a Bayesian semiparametric approach for dealing with regression models where the covariate is measured with error. Given that (1) the error normality assumption is very restrictive, and (2) assuming a specific elliptical distribution for errors (Student-t for example), may be somewhat presumptuous; there is need for more flexible methods, in terms of assuming only symmetry of errors (admitting unknown kurtosis). In this sense, the main advantage of this extended Bayesian approach is the possibility of considering generalizations of the elliptical family of models by using Dirichlet process priors in dependent and independent situations. Conditional posterior distributions are implemented, allowing the use of Markov Chain Monte Carlo (MCMC), to generate the posterior distributions. An interesting result shown is that the Dirichlet process prior is not updated in the case of the dependent elliptical model. Furthermore, an analysis of a real data set is reported to illustrate the usefulness of our approach, in dealing with outliers. Finally, semiparametric proposed models and parametric normal model are compared, graphically with the posterior distribution density of the coefficients.

Suggested Citation

  • Casanova, María P. & Iglesias, Pilar & Bolfarine, Heleno & Salinas, Victor H. & Peña, Alexis, 2010. "Semiparametric Bayesian measurement error modeling," Journal of Multivariate Analysis, Elsevier, vol. 101(3), pages 512-524, March.
    • Handle: RePEc:eee:jmvana:v:101:y:2010:i:3:p:512-524
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    References listed on IDEAS

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    1. Ignacio Vidal & Pilar Iglesias & Manuel Galea, 2007. "Influential Observations in the Functional Measurement Error Model," Journal of Applied Statistics, Taylor & Francis Journals, vol. 34(10), pages 1165-1183.
    2. Arellano-Valle, R.B. & del Pino, G. & Iglesias, P., 2006. "Bayesian inference in spherical linear models: robustness and conjugate analysis," Journal of Multivariate Analysis, Elsevier, vol. 97(1), pages 179-197, January.
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    Cited by:

    1. Riquelme, Marco & Bolfarine, Heleno & Galea, Manuel, 2015. "Robust linear functional mixed models," Journal of Multivariate Analysis, Elsevier, vol. 134(C), pages 82-98.
    2. Fabrizio Ruggeri & Henrique Bolfarine & Jorge Luis Bazán & Reinaldo B. Arellano‐Valle & Victor Hugo Lachos Davila & Mário de Castro, 2021. "2021 International Statistical Institute Mahalanobis Award: A Tribute to Heleno Bolfarine," International Statistical Review, International Statistical Institute, vol. 89(3), pages 435-446, December.

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