一类统计量的乘积的渐近性质和几乎处处中心极限定理

Acta mathematica scientia,Series A ›› 2013, Vol. 33 ›› Issue (3): 475-482.

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The Asymptotic Properties and Almost Sure Central Limit Theorems for the Products of a Class of Statistics

QIU Jin¹, LU Chuan-Rong²

1.School of Mathematics and Statistics, Zhejiang University of Finance and Economics, Hangzhou 310018;
2.Department of Mathematics, Zhejiang University, Hangzhou 310028

Received:2011-11-19 Revised:2013-02-28 Online:2013-06-25 Published:2013-06-25
Supported by:
浙江省自然科学基金(Y6110615)和教育部人文社会科学研究规划基金(12YJA910003)资助

Abstract

Abstract:

Let {X_n, -∞<n<∞} be a sequence of independent and identically distributed, positive, square integrable random variables with μ=EX₁, σ²=Var X₁>0. The asymptotic properties for the products of a class of statistics (or random functions) expressed by T_n=a_nS_n+R_n are discussed, where S_n=∑ⁿ_i=1X_i, a_n>0 is a sequence of constants, R_n=o(a_n√n) a.s.. The results contain the almost sure central limit theorems, asymptotically lognormality and the weak invariance principles. Some examples such as U-statistics, Von-Mises statistics, error variance estimates in linear models are stated to illustrate the generality of the results.

Key words: Products of statistics, Almost sure central limit theorem, Central limit theorem, Weak invariance principle

CLC Number:

60F05

QIU Jin, LU Chuan-Rong. The Asymptotic Properties and Almost Sure Central Limit Theorems for the Products of a Class of Statistics[J].Acta mathematica scientia,Series A, 2013, 33(3): 475-482.

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The Asymptotic Properties and Almost Sure Central Limit Theorems for the Products of a Class of Statistics

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