C. Y. Wang scite author profile

We consider regression analysis when covariate variables are the underlying regression coefficients of another linear mixed model. A naive approach is to use each subject's repeated measurements, which are assumed to follow a linear mixed model, and obtain subject-specific estimated coefficients to replace the covariate variables. However, directly replacing the unobserved covariates in the primary regression by these estimated coefficients may result in a significantly biased estimator. The aforementioned problem can be evaluated as a generalization of the classical additive error model where repeated measures are considered as replicates. To correct for these biases, we investigate a pseudo-expected estimating equation (EEE) estimator, a regression calibration (RC) estimator, and a refined version of the RC estimator. For linear regression, the first two estimators are identical under certain conditions. However, when the primary regression model is a nonlinear model, the RC estimator is usually biased. We thus consider a refined regression calibration estimator whose performance is close to that of the pseudo-EEE estimator but does not require numerical integration. The RC estimator is also extended to the proportional hazards regression model. In addition to the distribution theory, we evaluate the methods through simulation studies. The methods are applied to analyze a real dataset from a child growth study.

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Augmented Inverse Probability Weighted Estimator for Cox Missing Covariate Regression

Wang¹,

Chen

2001

Biometrics

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This article investigates an augmented inverse selection probability weighted estimator for Cox regression parameter estimation when covariate variables are incomplete. This estimator extends the Horvitz and Thompson (1952, Journal of the American Statistical Association 47, 663-685) weighted estimator. This estimator is doubly robust because it is consistent as long as either the selection probability model or the joint distribution of covariates is correctly specified. The augmentation term of the estimating equation depends on the baseline cumulative hazard and on a conditional distribution that can be implemented by using an EM-type algorithm. This method is compared with some previously proposed estimators via simulation studies. The method is applied to a real example.

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Weighted Semiparametric Estimation in Regression Analysis with Missing Covariate Data

Wang

Zhao

et al. 1997

Journal of the American Statistical Association

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Prospective Analysis of Logistic Case-Control Studies

Carroll

Wang

1995

Journal of the American Statistical Association

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C. Y. Wang

Cox Regression with Accurate Covariates Unascertainable: A Nonparametric-Correction Approach

Regression Analysis When Covariates Are Regression Parameters of a Random Effects Model for Observed Longitudinal Measurements

Augmented Inverse Probability Weighted Estimator for Cox Missing Covariate Regression

Weighted Semiparametric Estimation in Regression Analysis with Missing Covariate Data

Prospective Analysis of Logistic Case-Control Studies

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