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Double hierarchical generalized linear models (with discussion)
Article first published online: 28 FEB 2006
DOI: 10.1111/j.1467-9876.2006.00538.x
Issue
Journal of the Royal Statistical Society: Series C (Applied Statistics)
Volume 55, Issue 2, pages 139–185, April 2006
Additional Information
How to Cite
Lee, Y. and Nelder, J. A. (2006), Double hierarchical generalized linear models (with discussion). Journal of the Royal Statistical Society: Series C (Applied Statistics), 55: 139–185. doi: 10.1111/j.1467-9876.2006.00538.x
Publication History
- Issue published online: 28 FEB 2006
- Article first published online: 28 FEB 2006
- [Read before The Royal Statistical Society on Wednesday, September 28th, 2005, the President, Professor D. Holt, in the Chair]
- Abstract
- Article
- References
- Cited By
Keywords:
- Generalized linear models;
- Heavy-tailed distribution;
- Hierarchical generalized linear models;
- Hierarchical likelihood;
- h-likelihood;
- Joint generalized linear models;
- Random-effect models;
- Restricted maximum likelihood estimator;
- Stochastic volatility models
Summary. We propose a class of double hierarchical generalized linear models in which random effects can be specified for both the mean and dispersion. Heteroscedasticity between clusters can be modelled by introducing random effects in the dispersion model, as is heterogeneity between clusters in the mean model. This class will, among other things, enable models with heavy-tailed distributions to be explored, providing robust estimation against outliers. The h-likelihood provides a unified framework for this new class of models and gives a single algorithm for fitting all members of the class. This algorithm does not require quadrature or prior probabilities.