On a representation theorem for finitely exchangeable random vectors
Abstract
A random vector with the taking values in an arbitrary measurable space is exchangeable if its law is the same as that of for any permutation . We give an alternative and shorter proof of the representation result (Jaynes \cite{Jay86} and Kerns and Sz\'ekely \cite{KS06}) stating that the law of is a mixture of product probability measures with respect to a signed mixing measure. The result is "finitistic" in nature meaning that it is a matter of linear algebra for finite . The passing from finite to an arbitrary one may pose some measure-theoretic difficulties which are avoided by our proof. The mixing signed measure is not unique (examples are given), but we pay more attention to the one constructed in the proof ("canonical mixing measure") by pointing out some of its characteristics. The mixing measure is, in general, defined on the space of probability measures on , but for , one can choose a mixing measure on .
Keywords
Cite
@article{arxiv.1410.1777,
title = {On a representation theorem for finitely exchangeable random vectors},
author = {Svante Janson and Takis Konstantopoulos and Linglong Yuan},
journal= {arXiv preprint arXiv:1410.1777},
year = {2016}
}
Comments
We here give an alternative proof of the measurability of the random signed-measure underlying the construction. We also add an independent proof of the main algebraic fact used in the paper. Title updated