SOME STOCHASTIC INEQUALITIES AND ASYMPTOTIC NORMALITY OF SERIAL RANK STATISTICS IN GENERAL LINEAR-PROCESSES

被引：3

作者：

NIEUWENHUIS, G ^{[1
]}

RUYMGAART, F ^{[1
]}

机构：

[1] CATHOLIC UNIV NIJMEGEN,INST MATH,6525 ED NIJMEGEN,NETHERLANDS

来源：

JOURNAL OF STATISTICAL PLANNING AND INFERENCE | 1990年 / 25卷 / 01期

关键词：

empirical process; exponential inequalities; General linear process; Lyapunov's limit theorem; rank estimator;

D O I：

10.1016/0378-3758(90)90007-H

中图分类号：

O21 [概率论与数理统计]; C8 [统计学];

学科分类号：

020208 ; 070103 ; 0714 ;

摘要：

Let Xj=Σkε{lunate}zgkEj-k define a general linear process based on i.i.d. random variables Ej in R. Stochastic inequalities in terms of reduced empirical processes of Xi for i≤n and related (Xi>,Xi+h) are obtained by a truncation argument (cf. Chanda and Ruymgaart (1988)). Then rank estimators of serial dependence are considered which are based on scores, possibly unbounded. Asymptotic normality is established by a proof that involves Lyapunov's limit theorem and may have some independent interest. Even with not strongly mixing linear processes asymptotically normal rank estimators may occur, as shows an example. © 1990.

引用

页码：53 / 79

页数：27

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