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Varying-coefficient models for longitudinal processes with continuous-time informative dropout.

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Hogan, Joseph W 


Dropout is a common occurrence in longitudinal studies. Building upon the pattern-mixture modeling approach within the Bayesian paradigm, we propose a general framework of varying-coefficient models for longitudinal data with informative dropout, where measurement times can be irregular and dropout can occur at any point in continuous time (not just at observation times) together with administrative censoring. Specifically, we assume that the longitudinal outcome process depends on the dropout process through its model parameters. The unconditional distribution of the repeated measures is a mixture over the dropout (administrative censoring) time distribution, and the continuous dropout time distribution with administrative censoring is left completely unspecified. We use Markov chain Monte Carlo to sample from the posterior distribution of the repeated measures given the dropout (administrative censoring) times; Bayesian bootstrapping on the observed dropout (administrative censoring) times is carried out to obtain marginal covariate effects. We illustrate the proposed framework using data from a longitudinal study of depression in HIV-infected women; the strategy for sensitivity analysis on unverifiable assumption is also demonstrated.



Algorithms, Bayes Theorem, CD4 Lymphocyte Count, Depression, Female, HIV Infections, Humans, Likelihood Functions, Linear Models, Longitudinal Studies, Markov Chains, Models, Statistical, Monte Carlo Method, Patient Dropouts, Racial Groups, Regression Analysis, Statistics, Nonparametric, Time Factors

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Oxford University Press (OUP)