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Laws of Large Numbers for Dependent Heterogeneous Processes

Published online by Cambridge University Press:  11 February 2009

R.M. de Jong
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Abstract

This paper provides weak and strong laws of large numbers for weakly dependent heterogeneous random variables. The weak laws of large numbers presented extend known results to the case of trended random variables. The main feature of our strong law of large numbers for mixingale sequences is the less strict decay rate that is imposed on the mixingale numbers as compared to previous results.

Type
Research Article
Information
Econometric Theory , Volume 11 , Issue 2 , February 1995 , pp. 347 - 358
Copyright
Copyright © Cambridge University Press 1995

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References

REFERENCES

Andrews, D.W.K. (1988) Laws of large numbers for dependent non-identically distributed random variables. Econometric Theory 4, 458467.10.1017/S0266466600013396CrossRefGoogle Scholar
Andrews, D.W.K. (1991) An empirical process central limit theorem for dependent nonidentically distributed random variables. Journal of Multivariate Analysis 38, 187203.10.1016/0047-259X(91)90039-5CrossRefGoogle Scholar
Azuma, K. (1967) Weighted sums of certain dependent random variables. Tohoku Mathematical Journal 19, 357367.10.2748/tmj/1178243286CrossRefGoogle Scholar
Bierens, H. J. (1981) Robust Methods and Asymptotic Theory. Lecture notes in economics and mathematical systems 192. Berlin: Springer-Verlag.Google Scholar
Bierens, H.J. (1984) Model specification testing of time series regressions. Journal of Econometrics 24, 323353.10.1016/0304-4076(84)90025-3CrossRefGoogle Scholar
Chung, K.L. (1974) A Course in Probability Theory. New York: Academic Press.Google Scholar
Gallant, A.R. & White, H. (1988) A Unified Theory of Estimation and Inference for Nonlinear Dynamic Models. New York: Basil Black well.Google Scholar
Gut, A. (1992) The weak law of large numbers for arrays. Statistics and Probability Letters 14, 4952.10.1016/0167-7152(92)90209-NCrossRefGoogle Scholar
Hansen, B.E. (1991) Strong laws for dependent heterogeneous processes. Econometric Theory 7, 213221.10.1017/S0266466600004412CrossRefGoogle Scholar
Hansen, B.E. (1992) Strong laws for dependent heterogeneous processes. Erratum. Econometric Theory 8, 421422.10.1017/S0266466600013189CrossRefGoogle Scholar
McLeish, D.L. (1975) A maximal inequality and dependent strong laws. Annals of Probability 3, 829839.10.1214/aop/1176996269CrossRefGoogle Scholar
Pollard, D. (1984) Convergence of Stochastic Processes. New York: Springer-Verlag.10.1007/978-1-4612-5254-2CrossRefGoogle Scholar
Pötscher, B.M. & Prucha, I. (1991) Basic structure of the asymptotic theory in dynamic non-linear econometric models, part 1: Consistency and approximation concepts. Econometric Reviews 10, 125216.10.1080/07474939108800204CrossRefGoogle Scholar
Serfling, R.J. (1968) Contributions to central limit theory for dependent variables. Annals of Mathematical Statistics 39, 11581175.10.1214/aoms/1177698240CrossRefGoogle Scholar