Freedman's theorem for unitarily invariant states on the CCR algebra

Abstract

The set of states on CCR(), the CCR algebra of a separable Hilbert space , is here looked at as a natural object to obtain a non-commutative version of Freedman's theorem for unitarily invariant stochastic processes. In this regard, we provide a complete description of the compact convex set of states of CCR() that are invariant under the action of all automorphisms induced in second quantization by unitaries of . We prove that this set is a Bauer simplex, whose extreme states are either the canonical trace of the CCR algebra or Gaussian states with variance at least 1.

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