The Weak Convergence for Functions of Negatively Associated Random Variables 1

@inproceedings{Zhang2001TheWC,
  title={The Weak Convergence for Functions of Negatively Associated Random Variables 1},
  author={Li-Xin Zhang},
  year={2001}
}

References

Publications referenced by this paper.
Showing 1-10 of 11 references

Self-normalized central limit theorem and estimation of variance of partial sums for negative dependent random variables

  • L. X. Zhang, S. Shi
  • 1998
Highly Influential
4 Excerpts

Estimation of variance of partial sums of an associated sequence of random variables, Stochastic Processes Appl

  • M. Peligrad, R. Suresh
  • 1995
Highly Influential
4 Excerpts

Estimation of the variance of partial sums for \-mixing random variables

  • M. Peligrad, Q. M. Shao
  • J. Multivariate Anal
  • 1995
Highly Influential
3 Excerpts

nsch, The tacknife and the bootstrap for general stationary observations

  • H. R. Hu
  • Ann. Statist
  • 1989
Highly Influential
7 Excerpts

A Glivenko Cantelli lemma and weak convergence for empirical processes of associated sequences, Probab

  • H. Yu
  • Theory Related Fields
  • 1993
Highly Influential
1 Excerpt

A comparison theorem on maximal inequalities between negatively associated and independent random variables

  • Q. M. Shao
  • J. Theoret. Probab
  • 2000
1 Excerpt

A functional central limit theorem for asymptotically negatively dependent random fields

  • L. X. Zhang
  • Acta Math. Hungar
  • 2000

The invariance principle for NA random variables

  • Z. Y. Lin
  • Chinese Sci. Bull
  • 1997

The moment inequalities and weak convergence for negatively associated sequences, Sci. China

  • C. Su, L. C. Zhao, Y. B. Wang
  • 1997
3 Excerpts

A note on the almost sure convergence of sums of negatively dependent random variables, Statist

  • P. Matula
  • Probab. Lett
  • 1992

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