[1] |
PENG S. G-expectation, g-brownian motion and related stochastic calculus of ito type[J]. Stochastic Analysis & Applications, 2006, 2(4),541-567.
|
[2] |
PENG S. Multi-dimensional g-brownian motion and related stochastic calculus under g-expectation[J]. Stochastic Processes & Their Applications, 2008, 118(12): 2223-2253.
|
[3] |
PENG S. A new central limit theorem under sublinear expectations[J]. Mathematics, 2008, 53(8): 1989-1994.
|
[4] |
ZHANG L X. Strong limit theorems for extended independent and extended negatively dependent random variables under non-linear expectations[DB/OL]. arXiv.ORG: 1608.00710, 2016.
|
[5] |
ZHANG L X. Rosenthals inequalities for independent and negatively dependent random variables under sub-linear expectations with applications[J]. Science China Mathematics, 2016, 59(4): 751-768.
|
[6] |
ZHANG L X. Self-normalized moderate deviation and laws of the iterated logarithm under G-Expectation[J]. Communications in Mathematics and Statistics, 2016, 4(2): 229-263.
|
[7] |
ZHANG L X. Exponential inequalities under the sub-linear expectations with applications to laws of the iterated[J]. Science China Mathematics, 2016, 59(12): 2503-2526.
|
[8] |
WU Q, JIANG Y. Strong law of large numbers and Chover’s law of the iterated logarithm under sub-linear expectations[J]. Journal of Mathematical Analysis and Applications, 2018,460(1):252-270.
|
[9] |
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.
|
[10] |
SUNG S H. On the strong convergence for weighted sums of random variables[J]. Statistical Papers, 2011, 52(2): 447-454.
|
[11] |
CAI G H. Strong laws for weighted sums of NA random variables[J]. Metrika, 2008, 68(3): 323-331.
|
[12] |
WU Q, JIANG Y. Complete convergence and complete moment convergence for negatively associated sequences of random variables[J]. Journal of Inequalities & Applications, 2016, 2016:157.
|
[13] |
HUANG H, PENG J, WU X, et al. Complete convergence and complete moment convergence for arrays of rowwise ANA random variables[J]. Journal of Inequalities & Applications,2016, 2016:72.
|
[14] |
SHEN A, XUE M, WANG W. Complete convergence for weighted sums of extended negatively dependent random variables[J]. Communications in Statistics: Theory and Methods,2017, 46(3): 1433-1444.
|
[15] |
HUANG H, WANG D. A note on the strong limit theorem for weighted sums of sequences of negatively dependent random variables[J]. Journal of Inequalities & Applications, 2012, 2012:233.
|
[16] |
DENIS L, HU M, PENG S. Function spaces and capacity related to a sublinear expectation: Application to g-brownian motion paths[J].Potential Analysis,2011, 34(2): 139-161.
|
[1] |
PENG S. G-expectation, g-brownian motion and related stochastic calculus of ito type[J]. Stochastic Analysis & Applications, 2006, 2(4),541-567.
|
[2] |
PENG S. Multi-dimensional g-brownian motion and related stochastic calculus under g-expectation[J]. Stochastic Processes & Their Applications, 2008, 118(12): 2223-2253.
|
[3] |
PENG S. A new central limit theorem under sublinear expectations[J]. Mathematics, 2008, 53(8): 1989-1994.
|
[4] |
ZHANG L X. Strong limit theorems for extended independent and extended negatively dependent random variables under non-linear expectations[DB/OL]. arXiv.ORG: 1608.00710, 2016.
|
[5] |
ZHANG L X. Rosenthals inequalities for independent and negatively dependent random variables under sub-linear expectations with applications[J]. Science China Mathematics, 2016, 59(4): 751-768.
|
[6] |
ZHANG L X. Self-normalized moderate deviation and laws of the iterated logarithm under G-Expectation[J]. Communications in Mathematics and Statistics, 2016, 4(2): 229-263.
|
[7] |
ZHANG L X. Exponential inequalities under the sub-linear expectations with applications to laws of the iterated[J]. Science China Mathematics, 2016, 59(12): 2503-2526.
|
[8] |
WU Q, JIANG Y. Strong law of large numbers and Chover’s law of the iterated logarithm under sub-linear expectations[J]. Journal of Mathematical Analysis and Applications, 2018,460(1):252-270.
|
[9] |
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.
|
[10] |
SUNG S H. On the strong convergence for weighted sums of random variables[J]. Statistical Papers, 2011, 52(2): 447-454.
|
[11] |
CAI G H. Strong laws for weighted sums of NA random variables[J]. Metrika, 2008, 68(3): 323-331.
|
[12] |
WU Q, JIANG Y. Complete convergence and complete moment convergence for negatively associated sequences of random variables[J]. Journal of Inequalities & Applications, 2016, 2016:157.
|
[13] |
HUANG H, PENG J, WU X, et al. Complete convergence and complete moment convergence for arrays of rowwise ANA random variables[J]. Journal of Inequalities & Applications,2016, 2016:72.
|
[14] |
SHEN A, XUE M, WANG W. Complete convergence for weighted sums of extended negatively dependent random variables[J]. Communications in Statistics: Theory and Methods,2017, 46(3): 1433-1444.
|
[15] |
HUANG H, WANG D. A note on the strong limit theorem for weighted sums of sequences of negatively dependent random variables[J]. Journal of Inequalities & Applications, 2012, 2012:233.
|
[16] |
DENIS L, HU M, PENG S. Function spaces and capacity related to a sublinear expectation: Application to g-brownian motion paths[J].Potential Analysis,2011, 34(2): 139-161.
|