This paper introduces the notion of a log-affine geodesic connecting two vector states on a von Neumann algebra. The definition is linked to the standard notion of Boltzmann-Gibbs states in statistical physics and the related notion of quantum statistical manifolds. In the abelian case it is linked to the notion of exponential tangent spaces.
Abelian subalgebras and the Jordan structure of a von Neumann algebra
Observables IV: The presheaf perspective
A note on faithful traces on a von Neumann algebra
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