Semiparametric Bayesian Analysis of Nutritional Epidemiology Data in the Presence of Measurement Error |
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Authors: | Samiran Sinha Bani K. Mallick Victor Kipnis Raymond J. Carroll |
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Affiliation: | 1. Department of Statistics, Texas A&M University, College Station, Texas 77843, U.S.A.;2. Biometry Research Group, Division of Cancer Prevention and Control, National Cancer Institute, Bethesda, Maryland 20892, U.S.A. |
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Abstract: | Summary : We propose a semiparametric Bayesian method for handling measurement error in nutritional epidemiological data. Our goal is to estimate nonparametrically the form of association between a disease and exposure variable while the true values of the exposure are never observed. Motivated by nutritional epidemiological data, we consider the setting where a surrogate covariate is recorded in the primary data, and a calibration data set contains information on the surrogate variable and repeated measurements of an unbiased instrumental variable of the true exposure. We develop a flexible Bayesian method where not only is the relationship between the disease and exposure variable treated semiparametrically, but also the relationship between the surrogate and the true exposure is modeled semiparametrically. The two nonparametric functions are modeled simultaneously via B‐splines. In addition, we model the distribution of the exposure variable as a Dirichlet process mixture of normal distributions, thus making its modeling essentially nonparametric and placing this work into the context of functional measurement error modeling. We apply our method to the NIH‐AARP Diet and Health Study and examine its performance in a simulation study. |
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Keywords: | B‐splines Dirichlet process prior Gibbs sampling Measurement error Metropolis– Hastings algorithm Partly linear model |
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