Bayesian Inference of a Non normal Multivariate Partial Linear Regression Model

Section: Research Paper
Issue
Vol. 18 No. 2 (2021): Volume 18 Issue 2
Published
Jun 25, 2025
Pages
50-63

Abstract

This research includes the Bayesian estimation of the parameters of the multivariate partial linear regression model when the random error follows the matrix-variate generalized modified Bessel distribution and found the statistical test of the model represented by finding the Bayes factor criterion, the predictive distribution under assumption that the shape parameters are known. The prior distribution about the model parameters is represented by non-informative information, as well as the simulate on the generated data from the model by a suggested way based on different values of the shape parameters, the kernel function used in the generation was a Gaussian kernel function, the bandwidth (Smoothing) parameter was according to the rule of thumb. It found that the posterior marginal probability distribution of the location matrix and the predictive probability distribution is a matrix-t distribution with different parameters, the posterior marginal probability distribution of the scale matrix is proper distribution but it does not belong to the conjugate family, Through the Bayes factor criterion, it was found that the sample that was used in the generation process was drawn from a population that does not belong to the generalized modified Bessel population.

References

  1. AL-Mouel, A. S., & Mohaisen, A. J. (2017) "Study on Bayes Semiparametric Regression" Journal of Advances in Applied Mathematics, Vol. 2, No. 4, pages 197-207.
  2. Aydin, D., & Tuzemen, M. (2010) " Estimation in semi-parametric and additive regression using smoothing and regression spline", Second International Conference on Computer Research and Development, Computer Society.
  3. Box, G. P., & Tiao, G. C. (1973)"Bayesian Inference in Statistical Analysis" Addison Wesley publishing company, Inc. London, U.K.
  4. Choi, T., Lee, J. & Roy, A. (2009) " A note on the bayes factor in a semiparametric regression model", Journal of Multivariate Analysis(100), p.p.1316-1327.
  5. Gallaugher, M. P.B., & McNicholas, P.D. (2019) "Three Skewed Matrix Variate Distributions " Statistics & Probability Letters, Elsevier, vol.145, p.p. 103-109.
  6. Hardle, W. (1991)" Smoothing Technique with Implementation in S" Spring-Verlage, New York.
  7. Jefferys, H. (1961) Theory of Probability, Clarenden press, Oxford, London U.K.
  8. Koudou, A. E., & Ley, C. (2014) " Characterizations of GIG Laws: A survey Complemented with Two New Result" Proba. Surv., vol. 11, p.p. 161-176.
  9. Langrene, N., & Warin, X. (2019)" Fast and Stable Multivariate Kernel Density Estimation by Fast Sum Updating" Journal of Computational and Graphical Statistics, vol.28, p.p. 596-608.
  10. Lemonte, A. J., & Cordeiro, G. M. (2011) "The Exponentiated Inverse Gaussian" Journal of Statistics and Probability letters, vol.81, p.p.506-517, journal homepage: www.elsevier.com.
  11. Nagar, D. K., & Gupta, A. K. (2013) " Extended Matrix Variate Gamma and Beta function" Journal of Multivariate Analysis, vol. 122, p.p. 53-69.
  12. Press, S. J. (2003) "Subjective and Objective Bayesian Statistics Principles, Models and Application" John Wiley & Sons, Canada.
  13. Przystalski, M. (2014) "Estimation of the Covariance Matrix in Multivariate Partially Linear Models" Journal of Multivariate Analysis, Vol.123, pages 380 -385.
  14. Schucany, W. R., & Sommers, J. (1977) "Improved of Kernel Type Density Estimators" JASA, vol.72, No. 353, p.p. 420-423.
  15. Silverman, B.W. (1986) "Density Estimation for Statistics and Data Analysis" Chapman and Hall, London.
  16. Thabane, L., & Drekic, S. (2003) " Hypothesis testing for the generalized multivariate modified Bessel model "Journal of Multivariate Analysis, vol. 86, p.p.360-374.
  17. Thabane, L., & Haq, M. S. (2004) "On the Matrix-variate Generalized Hyperbolic Distribution and its Bayesian Applications "Journal of Theoretical and Applied Statistical Science, vol. 38(6), p.p.511-526.
  18. You, J., et al (2013) "Statistical Inference for Multivariate Partially Linear Regression Models" the Canadian journal of statistics, vol.41, No.1, pages1-22.

Authors

Sarmad Abdulkhaleq Salih

Department of Mathematics, College of Education for Pure Sciences, University of Hamdaniya, Mosul, Iraq

ORCID
Emad H. Aboudi

Department of Statistics College of Administration and Economics, University of Baghdad, Baghdad, , Iraq

Identifiers

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How to Cite

Abdulkhaleq Salih, S., سرمد, H. Aboudi, E., & عماد. (2025). Bayesian Inference of a Non normal Multivariate Partial Linear Regression Model. IRAQI JOURNAL OF STATISTICAL SCIENCES, 18(2), 50–63. Retrieved from https://rjps.uomosul.edu.iq/index.php/stats/article/view/20750