Fock representation of free convolution powers
Abstract
Let B be a star-algebra with a state φ, and t > 0. Through a Fock space construction, we define two states t and t on the tensor algebra T(B, φ) such that under the natural map (B, φ) → (T(B, φ), t, t), free independence of arguments leads to free independence, while Boolean independence of centered arguments leads to conditionally free independence. The construction gives a new operator realization of the (1+t)'th free convolution power of any joint (star) distribution. We also compute several von Neumann algebras which arise.
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