De Finetti Theorem on the infinite non-commutative torus
Abstract
The set of spreadabl estates on an infinite non-commutive torus AZα is determined for all values of the deformation parameter α. If α is irrational, the canonical trace is the only spreadable 2π state. If α is rational, the set of all spreadable states is a Bauer 2π simplex. Moreover, its boundary is the set of all infinite products of a single state on C(T). Finally, the simplex of all stationary states on AZα is proved to be the Poulsen simplex for all values of the deformation parameter α.
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