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Subspace Structures in Inner Product Spaces and von Neumann AlgebrasWe study subspaces of inner product spaces that are invariant with respect to a given von Neumann
Von Neumann J-algebras in a space with two symmetriesWe show that a von Neumann J-algebra A of type (B) does not contain J-positive (J
Representations of von Neumann Algebras and Ultraproducts ultraproducts of von Neumann algebras by Groh (J. Operator Theory 11(2), 395–404 1984) and Raynaud (J. Operator
Affiliated subspaces and the structure of von neumann algebras Neumann algebra M and the inner structure of the algebra M is studied. The following characterization
Subspace Structures in Inner Product Spaces and von Neumann AlgebrasWe study subspaces of inner product spaces that are invariant with respect to a given von Neumann
Von Neumann J-algebras in a space with two symmetriesWe show that a von Neumann J-algebra A of type (B) does not contain J-positive (J
Contiguity and Entire Separability of States on von Neumann Algebras and entirely separability for two sequences of states on von Neumann algebras. The ultraproducts technique
Affiliated subspaces and the structure of von neumann algebras Neumann algebra M and the inner structure of the algebra M is studied. The following characterization
Scattering matrices and Dirichlet-to-Neumann maps form with the help of Dirichlet-to-Neumann maps. © 2017 The Author(s)
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