Multilevel models with multivariate mixed response types

Harvey Goldstein, James Carpenter, Michael G. Kenward, Kate A. Levin

Research output: Contribution to journalArticlepeer-review

125 Citations (Scopus)

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 languageEnglish
Pages (from-to)173-197
Number of pages25
JournalStatistical Modelling
Volume9
Issue number3
DOIs
Publication statusPublished - 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

Fingerprint

Dive into the research topics of 'Multilevel models with multivariate mixed response types'. Together they form a unique fingerprint.

Cite this