A non-de Finetti theorem for countable Euclidean spaces

Abstract

The classical de Finetti Theorem classifies the Sym( N)-invariant probability measures on [0,1] N. More precisely it states that those invariant measures are combinations of measures of the form N where is a measure on [0,1]. Recently, Jahel--Tsankov generalized this theorem showing that under conditions on M, the group Aut(M) is de Finetti, i.e. Aut(M)-invariant measures on [0,1]M are mixtures of measures of the form M where is a measure on [0,1]. In this note, we give an example of a non-de Finetti non-Archimedean group.

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