4 If ${p_{\theta}$ is a $\sigma$-additive statistical model and $\pi$ a finitely additive prior, then any statistic T is sufficient, with respect to a suitable inference consistent with ${p_{\theta}$ and $\pi$, provided only that $p_{\theta}(T = t) = 0$ for all $\theta$ and t. Here, sufficiency is to be intended in the Bayesian sense, and consistency in the sense of Lane and Sudderth. As a corollary, if ${p_{\theta}$ is $\sigma$-additive and diffuse, then, whatever the prior $\pi$, there is an inference which is consistent with ${p_{\theta}$ and $\pi$. Two versions of the main result are also obtained for predictive problems.

Publié le : 1996-06-14
Classification:  Cardinality,  coherence,  consistent inference,  diffuse probability,  finite additivity,  perfect probability,  posterior Bayes rule,  prediction,  sufficient statistic,  62A15,  60A05

@article{1032526966,
     author = {Berti, Patrizia and Rigo, Pietro},
     title = {On the existence of inferences which are consistent with a given model},
     journal = {Ann. Statist.},
     volume = {24},
     number = {6},
     year = {1996},
     pages = { 1235-1249},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1032526966}
}

Berti, Patrizia; Rigo, Pietro. On the existence of inferences which are consistent with a given model. Ann. Statist., Tome 24 (1996) no. 6, pp.  1235-1249. http://gdmltest.u-ga.fr/item/1032526966/