Mixed effects logistic regression models for longitudinal binary response data with informative drop-out.

A shared parameter model with logistic link is presented for longitudinal binary response data to accommodate informative drop-out. The model consists of observed longitudinal and missing response components that share random effects parameters. To our knowledge, this is the first presentation of such a model for longitudinal binary response data. Comparisons are made to an approximate conditional logit model in terms of a clinical trial dataset and simulations. The naive mixed effects logit model that does not account for informative drop-out is also compared. The simulation-based differences among the models with respect to coverage of confidence intervals, bias, and mean squared error (MSE) depend on at least two factors: whether an effect is a between- or within-subject effect and the amount of between-subject variation as exhibited by variance components of the random effects distributions. When the shared parameter model holds, the approximate conditional model provides confidence intervals with good coverage for within-cluster factors but not for between-cluster factors. The converse is true for the naive model. Under a different drop-out mechanism, when the probability of drop-out is dependent only on the current unobserved observation, all three models behave similarly by providing between-subject confidence intervals with good coverage and comparable MSE and bias but poor within-subject confidence intervals, MSE, and bias. The naive model does more poorly with respect to the within-subject effects than do the shared parameter and approximate conditional models. The data analysis, which entails a comparison of two pain relievers and a placebo with respect to pain relief, conforms to the simulation results based on the shared parameter model but not on the simulation based on the outcome-driven drop-out process. This comparison between the data analysis and simulation results may provide evidence that the shared parameter model holds for the pain data.

[1]  O. Franzén,et al.  Inflammation and dental pain in man. , 1994, Endodontics & dental traumatology.

[2]  P. Albert,et al.  Models for longitudinal data: a generalized estimating equation approach. , 1988, Biometrics.

[3]  Adrian Dunne,et al.  Analysis of Nonrandomly Censored Ordered Categorical Longitudinal Data from Analgesic Trials , 1997 .

[4]  V. De Gruttola,et al.  Modelling progression of CD4-lymphocyte count and its relationship to survival time. , 1994, Biometrics.

[5]  D. Follmann,et al.  An approximate generalized linear model with random effects for informative missing data. , 1995, Biometrics.

[6]  J. Neuhaus Estimation efficiency and tests of covariate effects with clustered binary data. , 1993, Biometrics.

[7]  Mark R. Conaway,et al.  A random effects model for binary data , 1990 .

[8]  R F Woolson,et al.  Application of empirical Bayes inference to estimation of rate of change in the presence of informative right censoring. , 1992, Statistics in medicine.

[9]  Gary G. Koch,et al.  Analysis of categorical data , 1985 .

[10]  Peter J. Diggle,et al.  Informative dropout in longitudinal data analysis. , 1994 .

[11]  D. Rubin INFERENCE AND MISSING DATA , 1975 .

[12]  James H. Ware,et al.  A simulation study of estimators for rates of change in longitudinal studies with attrition. , 1991, Statistics in medicine.

[13]  Nan M. Laird,et al.  Multivariate Logistic Models for Incomplete Binary Responses , 1996 .

[14]  T. T. Have A mixed effects model for multivariate ordinal response data including correlated discrete failure times with ordinal responses. , 1996 .

[15]  D. Hedeker,et al.  A random-effects ordinal regression model for multilevel analysis. , 1994, Biometrics.

[16]  Roderick J. A. Little,et al.  Modeling the Drop-Out Mechanism in Repeated-Measures Studies , 1995 .

[17]  Raymond J. Carroll,et al.  Estimation and comparison of changes in the presence of informative right censoring by modeling the censoring process , 1988 .

[18]  Alan M. Zaslavsky,et al.  An Empirical Bayes Model for Markov-Dependent Binary Sequences with Randomly Missing Observations , 1995 .

[19]  K. Bailey,et al.  Estimation and comparison of changes in the presence of informative right censoring: conditional linear model. , 1989, Biometrics.