Abstract
We build upon the existing literature to formulate a class of models for multivariate mixtures of Gaussian, ordered or unordered categorical responses and continuous distributions that are not Gaussian, each of which can be defined at any level of a multilevel data hierarchy. We describe a Markov chain Monte Carlo algorithm for fitting such models. We show how this unifies a number of disparate problems, including partially observed data and missing data in generalized linear modelling. The two-level model is considered in detail with worked examples of applications to a prediction problem and to multiple imputation for missing data. We conclude with a discussion outlining possible extensions and connections in the literature. Software for estimating the models is freely available.
Original language | English |
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Pages (from-to) | 173-197 |
Number of pages | 25 |
Journal | Statistical Modelling |
Volume | 9 |
Issue number | 3 |
DOIs | |
Publication status | Published - Oct 2009 |
Keywords
- Box-Cox transformation
- data augmentation
- data coarsening
- latent Gaussian model
- maximum indicant model
- MCMC
- missing data
- mixed response models
- multilevel
- multiple imputation
- multivariate
- normalising transformations
- partially known values
- prediction
- prior-informed imputation
- probit model
- MULTIPLE IMPUTATION
- DATA AUGMENTATION
- VARIABLE MODELS
- DISCRETE