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Asymptotic Efficiency of Estimates for Models with Incidental Nuisance Parameters

Strasser, Helmut (1995) Asymptotic Efficiency of Estimates for Models with Incidental Nuisance Parameters. Forschungsberichte / Institut für Statistik, 34. Institut für Statistik und Mathematik, WU Vienna University of Economics and Business, Vienna.

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Abstract

In this paper we show that the well­known asymptotic efficiency bounds for full mixture models remain valid if individual sequences of nuisance parameters are considered. This is made precise both for some classes of random (i.i.d.) and non­random nuisance parameters. For the random case it is shown that superefficiency of the kind given by an example of Pfanzagl (1993) can happen only with low probability. The non-random case deals with permutation invariant estimators under one­dimensional nuisance parameters. It is shown that the efficiency bounds remain valid for individual non­random arrays of nuisance parameters whose empirical process, if it is centered around its limit and standardized, satisfies a compactness condition. The compactness condition is satisfied in the random case with high probability. The results make use of basic LAN-theory. Regularity conditions are stated in terms of L^2 ­differentiability. (authors' abstract)

Item Type: Paper
Additional Information: published as: Helmut Strasser (1996), Asymptotic Efficiency of Estimates for Models with Incidental Nuisance Parameters, Annals of Statistics, 24.
Divisions: Departments > Finance, Accounting and Statistics > Statistics and Mathematics
Depositing User: Repository Administrator
Date Deposited: 09 Jun 2004 19:32
Last Modified: 13 Jan 2017 11:09
URI: http://epub.wu.ac.at/id/eprint/498

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