References
- Bai, Y., Z. Y. Zhu, and W. K. Fung. 2008. Partial linear models for longitudinal data based on quadratic inference functions. Scandinavian Journal of Statistics 35 (1):104–18.
- Cai, Z., and H. Xiong. 2012. Partially varying coefficient instrumental variables models. Statistica Neerlandica 66 (2):85–110.
- Card, D. 1995. Using geographic variation in college proximity to estimate the return to schooling. In Aspects of labor market behaviour: Essays in honour of John Vanderkamp, edited by L. Christofides, E. Grant, and R. Swidinsky, 201–22. Toronto, Canada: University of Toronto Press.
- Fan, J. Q., T. Huang, and R. Z. Li. 2007. Analysis of longitudinal data with semiparametric estimation of covariance function. Journal of the American Statistical Association 102 (478):632–41.
- Fan, J., and Y. Liao. 2014. Endogeneity in high dimensions. Annals of Statistics 42 (3):872–917.
- Fan, J. Q., and R. Z. Li. 2004. New estimation and model selection procedures for semiparametric modeling in longitudinal data analysis. Journal of the American Statistical Association 99 (467):710–23.
- He, X. M., Z. Y. Zhu, and W. K. Fung. 2002. Estimation in a semiparametric model for longitudinal data with unspecified dependence structure. Biometrika 89 (3):579–90.
- Huang, J. T., and P. X. Zhao. 2017. QR decomposition based orthogonality estimation for partially linear models with longitudinal data. Journal of Computational and Applied Mathematics 321:406–15.
- Huang, J. T., and P. X. Zhao. 2018. Orthogonal weighted empirical likelihood-based variable selection for semiparametric instrumental variable models. Communications in Statistics - Theory and Methods 47 (18):4375–88.
- Liang, K. L., and S. L. Zeger. 1986. Longitudinal data analysis using generalised estimating equations. Biometrika 73 (1):13–22.
- Owen, A. B. 1990. Empirical likelihood ratio confidence regions. The Annals of Statistics 18 (1):90–120.
- Qu, A., B. G. Lindsay, and B. Li. 2000. Improving generalized estimating equations using quadratic inference functions. Biometrika 87 (4):823–36.
- Qu, A., and R. Li. 2006. Quadratic inference functions for varying-coefficient models with longitudinal data. Biometrics 62 (2):379–91.
- Schumaker, L. L. 1981. Spline function. New York, NY: Wiley.
- Tang, Y., H. J. Wang, and Z. Zhu. 2013. Variable selection in quantile varying coefficient models with longitudinal data. Computational Statistics & Data Analysis 57:435–49.
- Wang, K., and L. Lin. 2015. Simultaneous structure estimation and variable selection in partial linear varying coefficient models for longitudinal data. Journal of Statistical Computation and Simulation 85 (7):1459–73.
- Xue, L. G., and L. X. Zhu. 2007. Empirical likelihood for a varying coefficient model with longitudinal data. Journal of the American Statistical Association 102 (478):642–54.
- Yao, F., and J. S. Zhang. 2010. Efficient semiparametric instrumental variable estimation. Working Paper, Economics Department, West Virginia University. http://www.be.wvu.edu/div/econ//work/pdf_files/10-11.pdf.
- Yuan, J. Y., P. X. Zhao, and W. G. Zhang. 2016. Semiparametric variable selection for partially varying coefficient models with endogenous variables. Computational Statistics 31 (2):693–707.
- Yang, J., and H. Yang. 2016. Smooth-threshold estimating equations for varying coefficient partially nonlinear models based on orthogonality-projection method. Journal of Computational and Applied Mathematics 302:24–37.
- Zhao, P. X., and L. G. Xue. 2010. Empirical likelihood inferences for semiparametric varying-coefficient partially linear models with longitudinal data. Communications in Statistics-Theory and Methods 39 (11):1898–914.
- Zhao, P. X., and L. G. Xue. 2012. Variable selection in semiparametric regression analysis for longitudinal data. Annals of the Institute of Statistical Mathematics 64 (1):213–31.
- Zhao, P. X., and L. G. Xue. 2013. Empirical likelihood inferences for semiparametric instrumental variable models. Journal of Applied Mathematics and Computing 43 (1–2):75–90.
- Zhao, P. X., and G. R. Li. 2013. Modified SEE variable selection for varying coefficient instrumental variable models. Statistical Methodology 12:60–70.
- Zhao, Y. Y., J. G. Lin, P. R. Xu, and X. G. Ye. 2015. Orthogonality-projection-based estimation for semi-varying coefficient models with heteroscedastic errors. Computational Statistics & Data Analysis 89:204–21.
- Zhao, P. X., and X. S. Zhou. 2018. Robust empirical likelihood for partially linear models via weighted composite quantile regression. Computational Statistics 33 (2):659–74.
- Zhao, Y. Y., J. G. Lin, X. G. Ye, H. X. Wang, and X. F. Huang. 2018. Two-stage orthogonality based estimation for semiparametric varying-coefficient models and its applications in analyzing AIDS data. Biometrical Journal 60 (1):79–99.