Honam Mathematical Journal (호남수학학술지)

The Honam Mathematical Society (호남수학회)
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Lindley Type Estimation with Constrains on the Norm

  • Baek, Hoh-Yoo (Division of Mathematics and Informational Statistics, Wonkwang University) ;
  • Han, Kyou-Hwan (Division of Mathematics and Informational Statistics, Wonkwang University)
  • Published : 2003.07.30
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Abstract

Consider the problem of estimating a $p{\times}1$ mean vector ${\theta}(p{\geq}4)$ under the quadratic loss, based on a sample $X_1,\;{\cdots}X_n$. We find an optimal decision rule within the class of Lindley type decision rules which shrink the usual one toward the mean of observations when the underlying distribution is that of a variance mixture of normals and when the norm $||{\theta}-{\bar{\theta}}1||$ is known, where ${\bar{\theta}}=(1/p)\sum_{i=1}^p{\theta}_i$ and 1 is the column vector of ones. When the norm is restricted to a known interval, typically no optimal Lindley type rule exists but we characterize a minimal complete class within the class of Lindley type decision rules. We also characterize the subclass of Lindley type decision rules that dominate the sample mean.

Keywords

Acknowledgement

Supported by : Wonkwang University

References

  1. Handbook of Mathematical Functions Abramowitz, M.;Stegun, I.
  2. Annals of Statistics v.10 Differential geometry of curved exponential families, curvature and information loss Amari, S.
  3. Annals of Statistics v.3 Minimax estimation of location vectors for a wide class of densities Beger, J.
  4. Statistics and Probability Letters v.10 A note on adaptive generalized ridge regression estimator Chow, S.C.;Wang, S.C.
  5. Annals of Statistics v.6 The geometry of exponential families Efron, B.
  6. The Canadian Journal of Statistics v.10 An explicit formula for the risk of James-Stein estimators Egerton, M.F.;Laycock, P.J.
  7. Biometrika v.64 Conditional inference about a normal mean with known coefficient of variation Hinkley, D.V.
  8. Proceedings Fourth Berkeley Symp. Math. Statis. Probability v.1 Estimation with quadratic loss James, W.;Stein, C.
  9. Annals of Statistics v.17 Equivariant estimation in a model with ancillary statistics Kariya, T.
  10. Journal of the Royal Statistical Society, B v.24 Discussion of paper by C. Stein Lindley, D.V.
  11. Communication in Statistics-Theory and Methods v.22 no.10 James-Stein estimation with constraints on the norm Marchand, E.;Giri, N.C.
  12. Journal of Multivariate Analysis v.32 On the best equivariant estimator of mean of a multivariate normal population Perron, F.;Giri, N.
  13. Journal of Multivariate Analysis v.4 Minimax estimation of location parameters for certain spherically symmetric distributions Strawderman, W.E.