References
- Schick A. Estimation of the autocorrelation coefficient in the presence of a regression trend. Stat Probab Lett. 1994;21(5):371–380.
- Schick A. An adaptive estimator of the autocorrelation coefficient in regression models with autoregressive errors. J Time Ser Anal. 1998;19(5):575–589.
- Schick A. Efficient estimation in a semiparametric additive regression model with ARMA errors. Stat Textbooks Monogr. 1999;158:395–426.
- Sun XQ, You JH, Chen GM, et al. Convergence rates of estimators in partial linear regression models with MA(1) error process. Commun Stat-Theory Methods. 2002;31(12):2251–2273.
- Liang HY, Mammitzsch V, Steinebach J. On a semiparametric regression model whose errors from a linear process with negatively associated innovations. Stat: J Theor Appl Stat. 2006;40(3):207–226.
- Liang HY, Fan GL. Berry-Esseen type bounds of estimators in a semiparametric model with linear process errors. J Multivar Anal. 2009;100(1):1–15.
- Liang HY, Wang XZ. Convergence rate of wavelet estimator in semiparametric models with dependent MA(∞) errors procrss. Chinese J Appl Probab Stat. 2010;26(1):35–46.
- Alam K, Saxena KML. Positive dependence in multivariate distributions. Commun Stat-Theory Methods. 1981;10(12):1183–1196.
- Joag-Dev K, Proschan F. Negative association of random variables with applications. Ann Stat. 1983;11:286–295.
- Matula P. A note on the almost sure convergence of sums of negatively dependent random variables. Stat Probab Lett. 1992;15(3):209–212.
- Shao QM, Su C. The law of the iterated logarithm for negatively associated random variables. Stoch Process Their Appl. 1999;83(1):139–148.
- Su C, Zhao LC, Wang YB. Moment inequalities for NA sequence and weak convergence. Sci China, Ser A. 1996;26(12):1091–1099.
- Shao QM. A comparison theorem on maximum inequalities between negatively associated and independent random variables. J Theor Probab. 2000;13(2):343–356.
- Yang SC. Moment inequalities for partial sums of random variables. Sci China, Ser A. 2001;44:1–6.
- Yang SC, Wang YB. Strong consistency of regression function estimator for negatively associated samples. Acta Mathe Appl Sinica, Series A. 1999;22(4):522–530.
- Cai GH. Strong laws for weighted sums of NA random variables. Metrika. 2008;68:323–331.
- Chen PY, Hu TC, Liu X, et al. On complete convergence for arrays of row-wise negatively associated random variables. Theory Probab Appl. 2008;52(2):323–328.
- Wang XJ, Li XQ, Hu SH, et al. Strong limit theorems for weighted sums of negatively associated random variables. Stoch Anal Appl. 2011;29(1):1–14.
- Ling NX. The Bahadur representation for sample quantiles under negatively associated sequence. Stat Probab Lett. 2008;78(16):2660–2663.
- Roussas GG. Asymptotic normality of the kernel estimate of a probability density function under association. Stat Probab Lett. 2000;50(1):1–12.
- Huang W, Zhang LX. Asymptotic normality for U-statistics of negatively associated random variables. Stat Probab Lett. 2006;76(11):1125–1131.
- Hu SH. Fixed-design semiparametric regression for linear time series. Acta Math Sci, Series B. 2006;26(1):74–82.
- Wang XJ, Zheng LL, Hu SH. Complete consistency for the estimator of nonparametric regression models based on extended negatively dependent errors. Stat: J Theor Appl Stat. 2015;49(2):396–407.
- Georgiev AA. Local properties of function fitting estimates with applications to system identification. In: Grossmann W, Pflug G, Vincze I, et al., editors. Mathematical statistics and applications, Proceedings 4th pannonian symposium mathematical statistics, 1983 September 4–10; Bad Tatzmannsdorf, Austria. Dordrecht: Reidel; 1985. p. 141–151.
- Roussas GG, Tran LT, Ioannides DA. Fixed design regression for time series: asymptotic normality. J Multivar Anal. 1992;40(2):262-–291.
- Tran L, Roussas G, Yakowitz S, et al. Fixed design regression for linear time series. Ann Stat. 1996;24(3):975-–991.
- Liang HY, Jing BY. Asymptotic properties for estimates of nonparametric regression models based on negatively associated sequences. J Multivar Anal. 2005;95(2):227-–245.
- Chen X. Asymptotic properties for estimates of nonparametric regression model with martingale difference errors. Stat: J Theor Appl Stat. 2012;46(5):687–696.
- Yang WZ, Wang XJ, Wang XH, et al. The consistency for estimator of nonparametric regression model based on NOD errors. J Inequal Appl. 2012. Article ID 140, 13 pages.
- Chen ZY, Wang HB, Wang XJ. The consistency for the estimator of nonparametric regression model based on martingale difference errors. Stat Papers. 2016;57(2):451–469.
- Priestley MB, Chao MT. Non-parametric function fitting. J R Stat Soc, Series B (Statistical Methodology). 1972;34:385–392.
- Wu Y, Wang XJ, Balakrishnan N. On the consistency of the PC estimator in a nonparametric regression model. Stat Papers. in press. doi:10.1007/s00362-017-0966-9.