References
- Chen, P. Y., P. Bai, and S. H. Sung. 2014. The von Bahr-Esseen moment inequality for pairwise independent random variables and applications. Journal of Mathematical Analysis and Applications 419 (2):1290–302.
- Deng, X., X. J. Wang, S. H. Hu, and M. Hu. 2019. A general result on complete convergence for weighted sums of linear processes and its statistical applications. Statistics 53 (4):903–20.
- Dobrushin, R. L. 1956. The central limit theorem for non-stationary Markov chain. Theory of Probability and Its Applications 1:72–88.
- Feng, F. X., D. C. Wang, and Q. Y. Wu. 2016. An almost sure central limit theorem for self-normalized weighted sums of the φ mixing random variables. Journal of Mathematical Inequalities 10 (1):233–45.
- Herrndorf, N. 1983. The invariance principle for φ-mixing sequences. Zeitschrift fur Wahrscheinlichkeitstheorie und Verwandte 63 (1):97–108.
- Hu, D., P. Y. Chen, and S. H. Sung. 2017. Strong laws for weighted sums of ψ-mixing random variables and applications in errors-in-variables regression models. TEST 26 (3):600–17.
- Hu, S. H. 1994. Strong consistency of estimatiors of semiparametric regression model. Acta Mathematica Sinica, Chinese Series 40 (4):683–6.
- Hu, S. H. 1997. Consistency estimate for a new semiparametric regression model. Acta Mathematica Sinica, Chinese Series 40 (4):527–36.
- Hu, S. H. 1999. Estimator for a semiparametric regression model. Acta Mathematica Scientia, Series A 19 (5):541–9.
- Hu, S. H. 2006. Fixed-design semiparametric regression for linear time series. Acta Mathematica Scientia, Series B 26 (1):74–82.
- Huang, H. W., D. C. Wang, and J. Y. Peng. 2014. On the strong law of large numbers for weighted sums of φ-mixing random variables. Journal of Mathematical Inequalities 8 (3):465–73.
- Huang, H. W., Q. Y. Wu, H. J. Zhang, and D. X. Ye. 2015. On limiting behavior of weighted sums for arrays of rowwise φ-mixing random variables. Chinese Journal of Applied Probability Statistics 8 (3):465–73.
- Pan, G. M., S. H. Hu, L. B. Fang, and Z. D. Cheng. 2003. Mean consistency for a semiparametric regression model. Acta Mathematica Scientia, Series A 23 (5):598–606.
- Peligard, M. 1985. An invariance principle for φ-mixing sequences. The Annals of Probability 13 (4):1304–13.
- Sen, P. K. 1971. A note on weak convergence of empirical processes for sequences of φ-mixing random variables. The Annals of Mathematical Statistics 42:2131–33.
- Sen, P. K. 1974. Weak convergence of multidimensional empirical processes for stationary φ-mixing processes. The Annals of Probability 2 (1):147–54.
- Shao, Q. M. 1993. Almost sure invariance principles for mixing sequences of random variables. Stochastic Process and Their Applications 48 (2):319–34.
- Shen, A. T., X. H. Wang, and X. Q. Li. 2014a. On the rate of complete convergence for weighted sums of arrays of rowwise φ-mixing random variables. Communications in Statistics-Theory and Methods 43 (13):2714–25.
- Shen, A. T., X. H. Wang, J. M. Ling, and Y. F. Wei. 2014b. On complete convergence for nonstationary φ-mixing random variables. Communications in Statistics-Theory and Methods 43 (22):4856–66.
- Utev, S. A. 1990. The central limit theorem for φ-mixing arrays of random variables. Theory of Probability and Its Applications 35 (1):131–9.
- Wang, X. H., X. Q. Li, and S. H. Hu. 2014. Complete convergence of weighted sums for arrays of rowwise φ-mixing random variables. Applications of Mathematics 59 (5):589–607.
- Wang, X. J., X. Deng, and S. H. Hu. 2018. On consistency of the weighted least squares estimators in a semiparametric regression model. Metrika 81 (7):797–820.
- Wang, X. J., and S. H. Hu. 2012. Some Baum-Katz type results for φ-mixing random variables with different distributions. RACSAM 106:321–31.
- Wang, X. J., S. H. Hu, Y. Shen, and W. Z. Yang. 2010. On complete convergence for weighted sums of φ-mixing random variables. Journal of Inequalities and Applications 2010:372390, 13 pages.
- Wang, X. J., M. M. Ge, and Y. Wu. 2017. The asymptotic properties of the estimators in a semiparametric regression model. Statistical Papers. doi:https://doi.org/10.1007/s00362-017-0910-z.
- Wu, Q. Y. 2006. Probability limit theory for mixing sequences. Beijing, China: Science Press of China.
- Xi, M. M., and X. J. Wang. 2019. On the rates of asymptotic normality for recursive kernel density estimators under φ-mixing assumptions. Journal of Nonparametric Statistics 31 (2):340–63.
- Xiao, X. Y., and H. W. Yin. 2015. Precise rates in the law of iterated logarithm for the moment convergence of φ-mixing sequences. Mathematica Slovaca 65 (6):1571–88.
- Yang, W. Z., X. J. Wang, X. Q. Li, and S. H. Hu. 2012. Berry-Esséen bound of sample quantiles for φ-mixing random variables. Journal of Mathematical Analysis and Applications 388 (1):451–62.
- Yang, W. Z., X. J. Wang, and S. H. Hu. 2014. A note on the Berry-Esséen bound of sample quantiles for φ-mixing sequence. Communications in Statistics-Theory and Methods 43 (19):4187–94.