Statistical inference for varying-coefficient models with error-prone covariates

Motivated by an application, we consider the statistical inference of varying-coefficient regression models in which some covariates are not observed, but ancillary variables are available to remit them. Due to the attenuation, the usual local polynomial estimation of the coefficient functions is not consistent. We propose a corrected local polynomial estimation for the unknown coefficient functions by calibrating the error-prone covariates. It is shown that the resulting estimators are consistent and asymptotically normal. In addition, we develop a wild bootstrap test for the goodness of fit of models. Some simulations are conducted to demonstrate the finite sample performances of the proposed estimation and test procedures. An example of application on a real data from Duchenne muscular dystrophy study is also illustrated.