Joint modeling of longitudinal zero-inflated count and time-to-event data: A Bayesian perspective.
Longitudinal zero-inflated count data are encountered frequently in substance-use research when assessing the effects of covariates and risk factors on outcomes. Often, both the time to a terminal event such as death or dropout and repeated measure count responses are collected for each subject. In this setting, the longitudinal counts are censored by the terminal event, and the time to the terminal event may depend on the longitudinal outcomes. In the study described herein, we expand the class of joint models for longitudinal and survival data to accommodate zero-inflated counts and time-to-event data by using a Cox proportional hazards model with piecewise constant baseline hazard. We use a Bayesian framework via Markov chain Monte Carlo simulations implemented in the BUGS programming language. Via an extensive simulation study, we apply the joint model and obtain estimates that are more accurate than those of the corresponding independence model. We apply the proposed method to an alpha-tocopherol, beta-carotene lung cancer prevention study.
Duke Scholars
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Related Subject Headings
- Survival Analysis
- Statistics & Probability
- Poisson Distribution
- Outcome Assessment, Health Care
- Monte Carlo Method
- Markov Chains
- Longitudinal Studies
- Biomedical Research
- Bayes Theorem
- 4905 Statistics
Citation
Published In
DOI
EISSN
Publication Date
Volume
Issue
Start / End Page
Location
Related Subject Headings
- Survival Analysis
- Statistics & Probability
- Poisson Distribution
- Outcome Assessment, Health Care
- Monte Carlo Method
- Markov Chains
- Longitudinal Studies
- Biomedical Research
- Bayes Theorem
- 4905 Statistics