Efficient Estimation in Semivarying Coefficient Models for Longitudinal / Clustered Data

Abstract

In semivarying coefficient models for longitudinal/clustered data, we study semiparametric efficiency bound for estimation of the constant coefficients in a general setup. It can be achieved by spline regression provided that the within-cluster covariance matrices are all known, which is an unrealistic assumption. Thus, we propose an adaptive estimator of the constant coefficients when the covariance matrices are unknown and depend only on the index random variable, such as time, and when the link function is the identity function. After preliminary estimation based on working independence, we estimate the covariance matrices by applying local linear regression to the resulting residuals. Then we employ the covariance matrix estimates and spline regression to obtain our final estimators of the constant coefficients. The proposed estimator achieves the semiparametric efficiency bound under normality assumption, and it has the smallest covariance matrix among a class of estimators even when normality is violated. We also present results of simulation studies and a real data example. ??? ? ?This is joint work with Ming-Yen Cheng, National Taiwan University, and Jialiang Li, National University of Singapore and is available at the following website: http://arxiv.org/abs/1501.00538