In this paper we analyze approximately finite dimensional von Neumann algebras obtained as weak closure of fixed point algebras under xerox type action of compact groups on UHF algebras. We reduce our ...

Operator algebras and functional analysis form a foundational framework in modern mathematics, interlinking abstract algebraic structures with analytic techniques to study infinite‐dimensional spaces.

Rieffel's deformation quantization of C*-algebras for actions of ℝd can also be carried out on the von Neumann algebra level. Journal Information The Journal of Operator Theory endeavours to publish ...

Hilbert space theory and operator algebras provide a robust framework for analysing linear operators and their spectral properties, which are pivotal in both pure and applied mathematics. Hilbert ...

The spectrum of the canonical operator in the noncommutative 2-torus Tθ depending on the parameter θ ∈ [0,1] © Douglas Hofstadter's butterfly. Licensed under ...