Nonparametric estimation of the conditional expectation E(Y|U) of an outcome Y given a covariate vectorU is of primary importance in many statistical applications such as prediction and personalized medicine.In some problems, there is an additional auxiliary variable Z in the training dataset used to construct estimators, but Z is not available for future prediction or selecting patient treatment in personalized medicine. For example, in the training dataset longitudinal outcomes are observed, but only the last outcome Y is concerned in the future prediction or analysis. The longitudinal outcomes other than the last point is then the variable Z that is observed and related with both Y and U. Previous work on how to make use of Z in the estimation of E(Y|U) mainly focused on using Z in the construction of a linear function of U to reduce covariate dimension for better estimation. Using E(Y|U) = E{E(Y|U, Z)|U}, we propose a two-step estimation of inner and outer expectations, respectively, with sufficient dimension reduction for kernel estimation in both steps. The information from Z is used not only in dimension reduction, but also directly in the estimation. Because of the existence of different ways for dimension reduction, we construct two estimators that may improve the estimator without using Z. The improvements are shown in the convergence rate of estimators as the sample size increases to infinity as well as in the finite sample simulation performance. A real data analysis about the selection of mammography intervention is presented for illustration. Supplementary materials for this article are available online.
Publication:JOURNAL OF THE AMERICAN STATISTICAL ASSOCIATION
2021, VOL. 116, NO. 535, 1346–1357
Author:
Bingying Xie
Roche (China) Holding Ltd., Shanghai, China
Jun Shao
KLATASDS-MOE, School of Statistics, East China Normal University, Shanghai, China
Department of Statistics, University ofWisconsin-Madison, Madison, WI
shao@stat.wisc.edu