Tail algebras of quantum exchangeable random variables
classification
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keywords
algebraexchangeablequantumrandomstatetailvariablesalgebras
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We show that any countably generated von Neumann algebra with specified normal faithful state can arise as the tail algebra of a quantum exchangeable sequence of noncommutative random variables. We also characterize the cases when the state corresponds to a limit of convex combinations of free products states.
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