Keywords
- Shrinkage Estimator
- Location Scale Parameter
- Condition Suffisante
- Dispersion Versus
- Dimension Finie
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Références
ARTZNER (Ph.). Fonctions caractéristiques et mesures planes invariantes par rotation. (1970)-Séminaire de Probabilités V-Lecture Notes in mathematics 191 pp. 1–16.
CAMBANIS (S.), HUANG (S.) and SIMONS (G.). On the theory of elliptically contoured distributions. (1981)-Journal of Multivariate Analysis 11, pp.368–385.
CELLIER (D.), FOURDRINIER (D.) and ROBERT (C.). Controlled shrinkage estimators (a class of estimators better than the least squares estimator, with respect to a general quadratic loss, for normal observations). (1989)-Statistics 20, 1 pp. 1–10.
CELLIER (D.), FOURDRINIER (D.) and ROBERT (C.). Robust shrinkage estimators of the location parameter for elliptically symmetric distributions. (1989)-Journal of Multivariate Analysis 29, pp. 39–52.
CHMIELEWSKI (M.A.). Elliptically symmetric distributions: a review and bibliography. (1981)-Internat. Statist. Rev. 49, 67–74.
EATON (M.L.). A characterization of spherical distributions. (1986)-Journal of Multivariate Analysis 20, pp. 272–276.
KELKER (D.). Distribution theory of spherical distributions and a location scale parameter generalization. (1970)-Sankhyā A. 32 pp. 419–430.
KRUSKAL (W.). The coordinate-free approach to Gauss-Markov and its application to missing and extra observations. (1961)-Proceedings Fourth Berkeley Symp. Math. Statist. Probab., 1, pp. 435–451.
KRUSKAL (W.). When are Gauss-Markov and least squares estimators the same? A coordinate-free approach. (1968)-Ann. Math. Statist. 39, pp. 70–75.
NACHBIN (L.). The Haar Integral (1965)-D. Van Nostrand Company.
PHILOCHE (J.L.). Une condition de validité pour le test F. (1977)-Statistique et Analyse des Données 1, pp. 37–60.
STONE (M.). A unifed approach to coordinate-free multivariate analysis. (1977)-Ann. Inst. Statist. Math. A 29, pp. 43–57.
STONE (M.). Coordinate-Free Multivariate Statistics. (1987)-Clarendon Press-Oxford.
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© 1990 Springer-Verlag
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Cellier, D., Fourdrinier, D. (1990). Sur les lois a symetrie elliptique. In: Azéma, J., Yor, M., Meyer, P.A. (eds) Séminaire de Probabilités XXIV 1988/89. Lecture Notes in Mathematics, vol 1426. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0083772
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DOI: https://doi.org/10.1007/BFb0083772
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