Penalized profile least squares-based statistical inference for varying coefficient partially linear errors-in-variables models

• Published in: Science China. Mathematics Vol. 61; no. 9; pp. 1677 - 1694
• Main Authors: Fan, Guo-liang, Liang, Han-ying, Zhu, Li-xing
• Format: Journal Article
• Language: English
• Published: Beijing Science China Press 01.09.2018; Springer Nature B.V
• Subjects: Applications of Mathematics; Asymptotic methods; Asymptotic properties; Computer simulation; Confidence; Economic models; Estimating techniques; Least squares; Mathematical models; Mathematics; Mathematics and Statistics; Parameters; Statistical analysis; Statistical inference; Statistical tests; penalized likelihood; diverging number of parameters; 62G08; SCAD; 62G20; variable selection; varying coefficient partially linear model
• ISSN: 1674-7283; 1869-1862
• DOI: 10.1007/s11425-016-9108-y

The purpose of this paper is two fold. First, we investigate estimation for varying coefficient partially linear models in which covariates in the nonparametric part are measured with errors. As there would be some spurious covariates in the linear part, a penalized profile least squares estimation is suggested with the assistance from smoothly clipped absolute deviation penalty. However, the estimator is often biased due to the existence of measurement errors, a bias correction is proposed such that the estimation consistency with the oracle property is proved. Second, based on the estimator, a test statistic is constructed to check a linear hypothesis of the parameters and its asymptotic properties are studied. We prove that the existence of measurement errors causes intractability of the limiting null distribution that requires a Monte Carlo approximation and the absence of the errors can lead to a chi-square limit. Furthermore, confidence regions of the parameter of interest can also be constructed. Simulation studies and a real data example are conducted to examine the performance of our estimators and test statistic.