Bayesian latent variable models for mixed discrete outcomes.

In studies of complex health conditions, mixtures of discrete outcomes (event time, count, binary, ordered categorical) are commonly collected. For example, studies of skin tumorigenesis record latency time prior to the first tumor, increases in the number of tumors at each week, and the occurrence of internal tumors at the time of death. Motivated by this application, we propose a general underlying Poisson variable framework for mixed discrete outcomes, accommodating dependency through an additive gamma frailty model for the Poisson means. The model has log-linear, complementary log-log, and proportional hazards forms for count, binary and discrete event time outcomes, respectively. Simple closed form expressions can be derived for the marginal expectations, variances, and correlations. Following a Bayesian approach to inference, conditionally-conjugate prior distributions are chosen that facilitate posterior computation via an MCMC algorithm. The methods are illustrated using data from a Tg.AC mouse bioassay study.

[1]  J. Ware,et al.  Random-effects models for longitudinal data. , 1982, Biometrics.

[2]  B. Muthén A general structural equation model with dichotomous, ordered categorical, and continuous latent variable indicators , 1984 .

[3]  S. Zeger A regression model for time series of counts , 1988 .

[4]  G. C. Wei,et al.  A Monte Carlo Implementation of the EM Algorithm and the Poor Man's Data Augmentation Algorithms , 1990 .

[5]  D G Clayton,et al.  A Monte Carlo method for Bayesian inference in frailty models. , 1991, Biometrics.

[6]  S. Chib,et al.  Bayesian analysis of binary and polychotomous response data , 1993 .

[7]  A. Gelfand,et al.  Efficient parametrisations for normal linear mixed models , 1995 .

[8]  I. Moustaki A latent trait and a latent class model for mixed observed variables , 1996 .

[9]  Svetlozar T. Rachev,et al.  Stochastic models of tumor latency and their biostatistical applications , 1997 .

[10]  L. Ryan,et al.  Latent Variable Models for Mixed Discrete and Continuous Outcomes , 1997 .

[11]  Louise Ryan,et al.  Latent Variable Models for Teratogenesis Using Multiple Binary Outcomes , 1997 .

[12]  E. George,et al.  APPROACHES FOR BAYESIAN VARIABLE SELECTION , 1997 .

[13]  Jørgen Holm Petersen,et al.  An additive frailty model for correlated life times. , 1998, Biometrics.

[14]  A. H. Andersen,et al.  The Additive Genetic Gamma Frailty Model , 1998 .

[15]  P. Heagerty Marginally Specified Logistic‐Normal Models for Longitudinal Binary Data , 1999, Biometrics.

[16]  Robert Crouchley,et al.  A comparison of population average and random‐effect models for the analysis of longitudinal count data with base‐line information , 1999 .

[17]  B. Jørgensen,et al.  A state-space model for multivariate longitudinal count data , 1999 .

[18]  R. Tennant,et al.  Development of a transgenic mouse model for carcinogenesis bioassays: evaluation of chemically induced skin tumors in Tg.AC mice. , 1999, Toxicological sciences : an official journal of the Society of Toxicology.

[19]  M M Regan,et al.  Likelihood Models for Clustered Binary and Continuous Out comes: Application to Developmental Toxicology , 1999, Biometrics.

[20]  D. Dunson,et al.  Bayesian latent variable models for clustered mixed outcomes , 2000 .

[21]  M. Knott,et al.  Generalized latent trait models , 2000 .

[22]  S Y Lee,et al.  Latent variable models with mixed continuous and polytomous data , 2001, Biometrics.

[23]  A. Agresti,et al.  A Correlated Probit Model for Joint Modeling of Clustered Binary and Continuous Responses , 2001 .

[24]  Jian Qing Shi,et al.  Maximum Likelihood Estimation of Two‐Level Latent Variable Models with Mixed Continuous and Polytomous Data , 2001 .

[25]  D. Dunson,et al.  A Proportional Hazards Model for Incidence and Induced Remission of Disease , 2002, Biometrics.

[26]  Hongzhe Li An Additive Genetic Gamma Frailty Model for Linkage Analysis of Diseases with Variable Age of Onset Using Nuclear Families , 2002, Lifetime data analysis.

[27]  David B Dunson,et al.  A Bayesian Approach for Joint Modeling of Cluster Size and Subunit‐Specific Outcomes , 2003, Biometrics.

[28]  D. Dunson Dynamic Latent Trait Models for Multidimensional Longitudinal Data , 2003 .

[29]  R. Henderson,et al.  A serially correlated gamma frailty model for longitudinal count data , 2003 .

[30]  Michael A. West,et al.  BAYESIAN MODEL ASSESSMENT IN FACTOR ANALYSIS , 2004 .

[31]  D. Dunson Bayesian Semiparametric Isotonic Regression for Count Data , 2005 .