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Concerning the theory of τ-measurable operators affiliated to a semifinite von Neumann algebra, let τ be an exact normal semifinite trace on M, and let L1(M, τ) be the Banach space of τ-integrable
Concerning the theory of τ-measurable operators affiliated to a semifinite von Neumann algebra, let τ be an exact normal semifinite trace on M, and let L1(M, τ) be the Banach space of τ-integrable
Dominated convergence in measure on semifinite von Neumann algebras and arithmetic averages of measurable operators for the algebra M = B(H) of bounded linear operators with the canonical trace τ = tr on a Hilbert space H. We
Dominated convergence in measure on semifinite von Neumann algebras and arithmetic averages of measurable operators for the algebra M = B(H) of bounded linear operators with the canonical trace τ = tr on a Hilbert space H. We
Convergence of integrable operators affiliated to a finite von Neumann algebra© 2016, Pleiades Publishing, Ltd.In the Banach space L1(M, τ) of operators integrable with respect
Convergence of integrable operators affiliated to a finite von Neumann algebraIn a Banach space of operators integrable with respect to a tracial state $\tau$ on a von Neumann
Interpolation of positive operatorsWe study problems of interpolation of positive linear operators in couples of ordered Banach spaces
A non-commutative version of Nikishin's theorem algebra, L1(τ) be the space of integrable self-adjoint operators, and S be the space of self
On τ-Compactness of Products of τ-Measurable Operators of operators on a Hilbert space (Formula presented.), τ be a faithful normal semifinite trace on (Formula
Concerning the theory of ?-measurable operators affiliated to a semifinite von Neumann algebraConcerning the theory of ?-measurable operators affiliated to a semifinite von Neumann algebra
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