Author(s)

Jinghua Zhang^1,2, Liugen Xue¹

¹College of Applied Sciences, Beijing University of Technology, Beijing, China.
²Department of Information Engineering, Jingdezhen Ceramic Institute, Jiangxi, China.

In this article, we propose a generalized empirical likelihood inference for the parametric component in semiparametric generalized partially linear models with longitudinal data. Based on the extended score vector, a generalized empirical likelihood ratios function is defined, which integrates the within-cluster correlation meanwhile avoids direct estimating the nuisance parameters in the correlation matrix. We show that the proposed statistics are asymptotically Chi-squared under some suitable conditions, and hence it can be used to construct the confidence region of parameters. In addition, the maximum empirical likelihood estimates of parameters and the corresponding asymptotic normality are obtained. Simulation studies demonstrate the performance of the proposed method.

Longitudinal Data, Generalized Partially Linear Models, Empirical Likelihood, Quadratic Inference Function

Zhang, J. and Xue, L. (2020) Empirical Likelihood Inference for Generalized Partially Linear Models with Longitudinal Data. Open Journal of Statistics, 10, 188-202. doi: 10.4236/ojs.2020.102014.