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  • Book
  • © 1981

Statistical Estimation

Asymptotic Theory

Authors:

  1. I. A. Ibragimov

    1. LOMI, Leningrad, USSR

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    You can also search for this author in PubMed   Google Scholar

  2. R. Z. Has’minskii

    1. Doz., Institut Problem Peredači Inf., Moscow, USSR

    View author publications

    You can also search for this author in PubMed   Google Scholar

Part of the book series: Stochastic Modelling and Applied Probability (SMAP, volume 16)

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Table of contents (9 chapters)

  1. Front Matter

    Pages i-vii
    PDF

  2. Basic Notation

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 1-2

  3. Introduction

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 3-9

  4. The Problem of Statistical Estimation

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 10-112

  5. Local Asymptotic Normality of Families of Distributions

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 113-172

  6. Properties of Estimators in the Regular Case

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 173-213

  7. Some Applications to Nonparametric Estimation

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 214-240

  8. Independent Identically Distributed Observations. Densities with Jumps

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 241-280

  10. Several Estimation Problems in a Gaussian White Noise

    • I. A. Ibragimov, R. Z. Has’minskii
    Pages 321-361

  11. Back Matter

    Pages 363-403
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About this book

when certain parameters in the problem tend to limiting values (for example, when the sample size increases indefinitely, the intensity of the noise ap­ proaches zero, etc.) To address the problem of asymptotically optimal estimators consider the following important case. Let X 1, X 2, ... , X n be independent observations with the joint probability density !(x,O) (with respect to the Lebesgue measure on the real line) which depends on the unknown patameter o e 9 c R1. It is required to derive the best (asymptotically) estimator 0:( X b ... , X n) of the parameter O. The first question which arises in connection with this problem is how to compare different estimators or, equivalently, how to assess their quality, in terms of the mean square deviation from the parameter or perhaps in some other way. The presently accepted approach to this problem, resulting from A. Wald's contributions, is as follows: introduce a nonnegative function w(0l> ( ), Ob Oe 9 (the loss function) and given two estimators Of and O! n 2 2 the estimator for which the expected loss (risk) Eown(Oj, 0), j = 1 or 2, is smallest is called the better with respect to Wn at point 0 (here EoO is the expectation evaluated under the assumption that the true value of the parameter is 0). Obviously, such a method of comparison is not without its defects.
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Keywords

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Authors and Affiliations

  • LOMI, Leningrad, USSR

    I. A. Ibragimov

  • Doz., Institut Problem Peredači Inf., Moscow, USSR

    R. Z. Has’minskii

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  • Own it forever

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