Hostname: page-component-745bb68f8f-lrblm Total loading time: 0 Render date: 2025-02-06T05:17:51.370Z Has data issue: false hasContentIssue false
  • English
  • Français

ASYMPTOTIC BEHAVIORS FOR CORRELATED BERNOULLI MODEL

Part of: Parametric inference Limit theorems

Published online by Cambridge University Press:  11 July 2019

Yu Miao Open the ORCID record for Yu Miao [Opens in a new window] ,
Huanhuan Ma  and
Qinglong Yang
Yu Miao
Affiliation:
College of Mathematics and Information Science, Henan Normal University, Henan Province453007, China E-mail: yumiao728@gmail.com; huanhuanma16@126.com
Huanhuan Ma
Affiliation:
College of Mathematics and Information Science, Henan Normal University, Henan Province453007, China E-mail: yumiao728@gmail.com; huanhuanma16@126.com
Qinglong Yang
Affiliation:
School of Statistics and Mathematics, Zhongnan University of Economics and Law, Hubei Province430073, China E-mail: yangqinglong@zuel.edu.cn
Rights & Permissions [Opens in a new window]

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

We consider a class of correlated Bernoulli variables, which have the following form: for some 0 < p < 1,

$$\begin{align}{P(X_{j+1}=1 \vert {\cal F}_{j})= (1-\theta_j)p+\theta_jS_j/j,}\end{align}$$
where 0 ≤ θj ≤ 1, $S_n=\sum _{j=1}^nX_j$ and ${\cal F}_n=\sigma \{X_1,\ldots , X_n\}$. The aim of this paper is to establish the strong law of large numbers which extend some known results, and prove the moderate deviation principle for the correlated Bernoulli model.

Keywords

Bernoulli modelmartingalemoderate deviationstrong law of large numbers

MSC classification

Primary: 60F10: Large deviations
Secondary: 60F15: Strong theorems 62F12: Asymptotic properties of estimators
Type
Research Article
Information
Probability in the Engineering and Informational Sciences , Volume 34 , Issue 4 , October 2020 , pp. 570 - 582
Copyright
Copyright © Cambridge University Press 2019

References

1.Djellout, H. (2002). Moderate deviations for martingale differences and applications to ϕ-mixing sequences. Stochastics and Stochastics Reports 73(1–2): 3763.CrossRefGoogle Scholar
2.Drezner, Z. & Farnum, N. (1993). A generalized binomial distribution. Communications in Statistics. Theory and Methods 22(11): 30513063.10.1080/03610929308831202CrossRefGoogle Scholar
3.Hall, P. & Heyde, C.C. (1980). Martingale limit theory and its application. New York-London: Academic Press Inc.Google Scholar
4.Heyde, C.C. (2004). Asymptotics and criticality for a correlated Bernoulli process. Australian & New Zealand Journal of Statistics 46(1): 5357.CrossRefGoogle Scholar
5.Hoeffding, W. (1963). Probability inequalities for sums of bounded random variables. Journal of the American Statistical Association 58: 1330.CrossRefGoogle Scholar
6.James, B., James, K., & Qi, Y.C. (2008). Limit theorems for correlated Bernoulli random variables. Statistics & Probability Letters 78(15): 23392345.CrossRefGoogle Scholar
7.Wu, L., Qi, Y.C., & Yang, J.P. (2012). Asymptotics for dependent Bernoulli random variables. Statistics & Probability Letters 82(3): 455463.CrossRefGoogle Scholar
8.Zhang, Y. & Zhang, L.X. (2015). On the almost sure invariance principle for dependent Bernoulli random variables. Statistics & Probability Letters 107: 264271.CrossRefGoogle Scholar
9.Zhang, Y. & Zhang, L.X. (2017). Limit theorems for dependent Bernoulli variables with statistical inference. Communications in Statistics. Theory and Methods 46(4): 15511559.CrossRefGoogle Scholar