A hybrid Markov chain for the Bayesian analysis of the multinomial probit model

被引:0
作者
Agostino Nobile
机构
[1] University of Bristol,Department of Mathematics
来源
Statistics and Computing | 1998年 / 8卷
关键词
Multinomial probit model; Gibbs sampling; Metropolis algorithm; Bayesian analysis;
D O I
暂无
中图分类号
学科分类号
摘要
Bayesian inference for the multinomial probit model, using the Gibbs sampler with data augmentation, has been recently considered by some authors. The present paper introduces a modification of the sampling technique, by defining a hybrid Markov chain in which, after each Gibbs sampling cycle, a Metropolis step is carried out along a direction of constant likelihood. Examples with simulated data sets motivate and illustrate the new technique. A proof of the ergodicity of the hybrid Markov chain is also given.
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页码:229 / 242
页数:13
相关论文
共 26 条
  • [1] Albert J. H.(1993)Bayesian analysis of binary and polychotomous response data Journal of the American Statistical Association 88 669-679
  • [2] Chib S.(1991)Estimability in the multinomial probit model Transportation Research 25 1-12
  • [3] Bunch D. S.(1985)Parameter estimability in the multinomial probit model Transportation Research 19 526-528
  • [4] Dansie B. R.(1990)Sampling-based approaches to calculating marginal densities Journal of the American Statistical Association 85 398-409
  • [5] Gelfand A. E.(1994)Alternative computational approaches to inference in the multinomial probit model Review of Economics and Statistics 76 609-632
  • [6] Smith A. F. M.(1994)Statistical inference in the multinomial multiperiod probit model Journal of Econometrics 80 125-165
  • [7] Geweke J.(1970)Monte Carlo sampling methods using Markow chains and their applications Biometrika 57 97-109
  • [8] Keane M.(1992)A note on identification in the multinomial probit model Journal of Business and Economic Statistics 10 193-200
  • [9] Runkle D.(1994)A computationally practical simulation estimator for panel data Econometrica 62 95-116
  • [10] Geweke J.(1994)An exact likelihood analysis of the multinomial probit model Journal of Econometrics 64 207-240
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