Bayesian methods for generalized linear models with covariates missing at random |
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Authors: | Joseph G Ibrahim Ming‐Hui Chen Stuart R Lipsitz |
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Abstract: | The authors propose methods for Bayesian inference for generalized linear models with missing covariate data. They specify a parametric distribution for the covariates that is written as a sequence of one‐dimensional conditional distributions. They propose an informative class of joint prior distributions for the regression coefficients and the parameters arising from the covariate distributions. They examine the properties of the proposed prior and resulting posterior distributions. They also present a Bayesian criterion for comparing various models, and a calibration is derived for it. A detailed simulation is conducted and two real data sets are examined to demonstrate the methodology. |
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Keywords: | Bayesian criterion data augmentation Gibbs sampling historical data logistic regression Poisson regression predictive distribution prior distribution |
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