Note on a Theorem of Dynkin on the Dimension of Sufficient Statistics
Denny, J. L.
Ann. Math. Statist., Tome 40 (1969) no. 6, p. 1474-1476 / Harvested from Project Euclid
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We show that the existence of a continuous minimal sufficient statistic not equivalent to the order statistics, for $n \geqq 2$ independent observations, is not a sufficient condition for the family of densities, assumed to be Lipschitz, to be an exponential family. This result is intended to be compared with a theorem of Dynkin (p. 24 of [3]) which asserts that the existence of a sufficient statistic not equivalent to the order statistics implies that the family of densities is an exponential family, provided that the densities possess continuous derivatives.
Publié le : 1969-08-14
Classification:  
@article{1177697518,
     author = {Denny, J. L.},
     title = {Note on a Theorem of Dynkin on the Dimension of Sufficient Statistics},
     journal = {Ann. Math. Statist.},
     volume = {40},
     number = {6},
     year = {1969},
     pages = { 1474-1476},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1177697518}
}

Denny, J. L. Note on a Theorem of Dynkin on the Dimension of Sufficient Statistics. Ann. Math. Statist., Tome 40 (1969) no. 6, pp.  1474-1476. http://gdmltest.u-ga.fr/item/1177697518/