De Finetti Theorem on the CAR Algebra
Abstract
The symmetric states on a quasi local C∗–algebra on the infinite set of indices J are those invariant under the action of the group of the permutations moving only a finite, but arbitrary, number of elements of J . The celebrated De Finetti Theorem describes the structure of the symmetric states (i.e. exchangeable probability measures) in classical probability. In the present paper we extend the De Finetti Theorem to the case of the CAR algebra, that is for physical systems describing Fermions. Namely, after showing that a symmetric state is automatically even under the natural action of the parity automorphism, we prove that the compact convex set of such states is a Choquet simplex, whose extremal (i.e. ergodic w.r.t. the action of the group of permutations previously described) are precisely the product states in the sense of Araki–Moriya. In order to do that, we also prove some ergodic properties naturally enjoyed by the symmetric states which have a self–containing interest.
Autore Pugliese
Tutti gli autori
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CRISMALE V.
Titolo volume/Rivista
Non Disponibile
Anno di pubblicazione
2012
ISSN
0010-3616
ISBN
Non Disponibile
Numero di citazioni Wos
9
Ultimo Aggiornamento Citazioni
Non Disponibile
Numero di citazioni Scopus
9
Ultimo Aggiornamento Citazioni
Non Disponibile
Settori ERC
Non Disponibile
Codici ASJC
Non Disponibile
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