A famous theorem of De Finetti (1931) shows that an exchangeable sequence of $\{0, 1\}$-valued random variables is a unique mixture of coin tossing processes. Many generalizations of this result have been found; Hewitt and Savage (1955) for example extended De Finetti's theorem to arbitrary compact state spaces (instead of just $\{0, 1\}$). Another type of question arises naturally in this context. How can mixtures of independent and identically distributed random sequences with certain specified (say normal, Poisson, or exponential) distributions be characterized among all exchangeable sequences? We present a general theorem from which the "abstract" theorem of Hewitt and Savage as well as many "concrete" results--as just mentioned--can be easily deduced. Our main tools are some rather recent results from harmonic analysis on abelian semigroups.

Publié le : 1985-08-14
Classification:  De Finetti's theorem,  exchangeability,  Hewitt and Savage's theorem,  (completely) positive definite functions on $\ast$-semigroups,  Radon-presentability,  integrated Cauchy functional equation,  convolution semigroups,  Schoenberg triples,  multivariate survival function,  60E05,  43A35,  60B99,  62A05,  44A05

@article{1176992913,
     author = {Ressel, Paul},
     title = {De Finetti-type Theorems: An Analytical Approach},
     journal = {Ann. Probab.},
     volume = {13},
     number = {4},
     year = {1985},
     pages = { 898-922},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1176992913}
}

Ressel, Paul. De Finetti-type Theorems: An Analytical Approach. Ann. Probab., Tome 13 (1985) no. 4, pp.  898-922. http://gdmltest.u-ga.fr/item/1176992913/