Open Access
VOL. 7 | 2010 On the estimation of cross-information quantities in rank-based inference
Chapter Author(s) Delphine Cassart, Marc Hallin, Davy Paindaveine
Editor(s) J. Antoch, M. Hušková, P.K. Sen
Inst. Math. Stat. (IMS) Collect., 2010: 35-45 (2010) DOI: 10.1214/10-IMSCOLL704

Abstract

Rank-based inference and, in particular, R-estimation, is a red thread running through Jana Jurečková’s entire scientific career, starting with her dissertation in 1967, where she laid the foundations of an extension to linear regression of the R-estimation methods that had recently been proposed by Hodges and Lehmann [13]. Cross-information quantities in that context play an essential role. In location/regression problems, these quantities take the form 01φ(u)φg(u) du where φ is a score function and φg(u):=g'(G1(u))/g(G1(u)) is the log-derivative of the unknown actual underlying density g computed at the quantile G1(u); in other models, they involve more general scores. Such quantities appear in the local powers of rank tests and the asymptotic variance of R-estimators. Estimating them consistently is a delicate problem that has been extensively considered in the literature. We provide here a new, flexible, and very general method for that problem, which furthermore applies well beyond the traditional case of regression models.

Information

Published: 1 January 2010
First available in Project Euclid: 29 November 2010

MathSciNet: MR2808364

Digital Object Identifier: 10.1214/10-IMSCOLL704

Subjects:
Primary: 62G99
Secondary: 62G05 , 62G10

Keywords: asymptotic variance , cross-information , local power , rank tests , R-estimation , Sample

Rights: Copyright © 2010, Institute of Mathematical Statistics

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