References
- Baum, L. E., and M. Katz. 1965. Convergence rates in the law of large numbers. Transactions of the American Mathematical Society 120(1):108–23.
- Erdös, P. 1949. On a theorem of Hsu and Robbins. Annals of Mathematical Statistics 20:286–91.
- Hsu, P. L., and H. Robbins. 1947. Complete convergence and the law of large numbers. Proceedings of the National Academy of Sciences USA 33(2):25–31.
- Huan, N. V., N. V. Quang, and N. T. Thuan. 2014. Baum–Katz type theorems for coordinatewise negatively associated random vectors in Hilbert spaces. Acta Mathematica Hungarica 144(1):132–419.
- Ko, M. H., T. S. Kim, and K. H. Han. 2009. A note on the almost sure convergence for dependent random variables in a Hilbert space. Journal of Theoretical Probability 22:506–13.
- Kuczmaszewska, A. 2010. On complete convergence in Marcinkiewicz-Zygmund type SLLN for negatively associated random variables. Acta Mathematica Hungarica 128:116–30.
- Peligrad, M., and A. Gut. 1999. Almost sure results for a class of dependent random variables. Journal of Theoretical Probability 12:87–104.
- Shao, Q. M. 2000. A comparison theorem on moment inequalities between negatively associated and independent random variables. Journal of Theoretical Probability 13:343–56.
- Yuan, D. M., and X. S. Wu. 2010. Limiting behaviors of the maximum of the partial sum for asymptotically negatively associated random variables under residual Cesàro alpha-integrability assumption. Journal of Statistical Planning and Inference 140:2395–402.
- Zhang, L. X. 2000a. A functional central limit theorem for asymptotically negatively dependent random fields. Acta Mathematica Hungarica 86:237–59.
- Zhang, L. X. 2000b. Central limit theorems for asymptotically negatively dependent random fields. Acta Mathematica Sinica, English Series 16:691–710.