Title of article
Bayesian Cure Rate Frailty Models with Application to a Root Canal Therapy Study
Author/Authors
Guosheng، Yin, نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2005
Pages
-551
From page
552
To page
0
Abstract
Due to natural or artificial clustering, multivariate survival data often arise in biomedical studies, for example, a dental study involving multiple teeth from each subject. A certain proportion of subjects in the population who are not expected to experience the event of interest are considered to be "cured" or insusceptible. To model correlated or clustered failure time data incorporating a surviving fraction, we propose two forms of cure rate frailty models. One model naturally introduces frailty based on biological considerations while the other is motivated from the Cox proportional hazards frailty model. We formulate the likelihood functions based on piecewise constant hazards and derive the full conditional distributions for Gibbs sampling in the Bayesian paradigm. As opposed to the Cox frailty model, the proposed methods demonstrate great potential in modeling multivariate survival data with a cure fraction. We illustrate the cure rate frailty models with a root canal therapy data set.
Keywords
Multivariate failure time data , Bayesian inference , Proportional hazards , Frailty model , Cure fraction , Gibbs sampling
Journal title
BIOMETRICS (BIOMETRIC SOCIETY)
Serial Year
2005
Journal title
BIOMETRICS (BIOMETRIC SOCIETY)
Record number
84078
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