[1]  Billingsley P. Convergence of Probabilty Measures. New York: Wiley, 1968

[2]  Ioannides D A, Roussas G G. Exponential inequality for associated random variables. Statist Probab Lett, 1999, 42: 423--431

[3]  Joag-Dev K, Proschan F. Negative association of random variables with applications. Ann Statist, 1983, 11(1): 286--295

[4]  Jabbari N  H,  Azarnoosh H A. Exponential inequality for negatively associated random variables. Statistical Papers, 2009, 50(2): 419--428

[5]  Matula P. A note on the almost sure convergence of sums of negatively dependent random variables. Statist Probab Lett, 1992, 15(3): 209--213

[6]  Oliveira P D. An exponential inequality for associated variables. Statist Probab  Lett, 2005, 73: 189--197

[7]  Su Chun, Zhao Lincheng, Wang Yuebao. Moment inequalities for NA sequence and weak convergence. Science in China (Series A), 1996, 26(12): 1091--1099

[8]  Shao Qiman, Su Chun. The law of the iterated logarithm for negatively associated random variables. Stochastic Process Appl, 1999,  83: 139--148

[9]  Shao Qiman. A comparison theorem on maximal inequalities between negatively associated and independent random variables. J Theor Probab, 2000, 13(2): 343--356

[10]  Yang Shanchao. Moment inequalities for partial sums of random variables. Science in China (Series A), 2001, 44: 1--6

[11]  Yang Shanchao, Wang Yuebao. Strong consistency of regression function estimator for negatively associated samples. Acta Mathematicae Applicatae Sinica (in Chinese), 1999, 22(4): 522--530

[12]  Li Yongming, Yang Shanchao. The rate of uniformly asymptotic normality for probability density estimator under negatively associated samples. Acta Math Sci, 2005, 25A(5): 643--651