|
|
- 2015
行为ND随机变量阵列加权和的矩完全收敛性
|
Abstract:
摘要: 利用Hoffmann-type不等式及一系列矩不等式,通过必要的放缩,得出ND随机阵列权加和的矩完全收敛的充分条件。
Abstract: By making good use of Hoffmann-type inequality and a series of moments inequalities, and some necessary scalings, the sufficient condition of complete moment convergence of weighted sums of arrays of rowwise ND random variables was obtained
| [1] | HSU P L, ROBBINS H. Complete convergence and the law of large numbers[J]. Proceedings of the National Academy of Sciences of the United States of America, 1947, 33(2):25-31. |
| [2] | SHEN A T. Probability inequalities for END sequence and their applications[J]. Journal of Inequalities and Applications, 2011, 2011(1):98.1-98.12. |
| [3] | BAUM L E, KATE M. Convergence rates in the law of large numbers[J]. Transactions of the American Mathematical Society, 1965, 120(1):108-123. |
| [4] | WU Qunying. A complete convergence theorem for weighted sums of arrays of rowwise negatively dependent random variables[J]. Journal of Inequalities and Applications, 2012, 2012(1):1-10. |
| [5] | BAEK J I, CHOI I B, NIU S L. On the complete convergence of weighted sums for arrays of negatively associated variables[J]. Journal of the Korean Statistical Society, 2008, 37(1):73-80. |
| [6] | JOAG-DEV K, PROSCHAN F. Negative association of random variables with applications[J]. The Annals of Statistics, 1983: 286-295. |
| [7] | BOZOAGNIA A, PATTERSON R F, TAYLOR R L. Limit theorems for ND random variables[R]. Atlanta: University of Georfia,1993. |
| [8] | WU Qunying. Probability limit theory for mixed sequence[M]. Beijing: China Science Press, 2006. |
