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The algebra of thin measurable operators is directly finite$-measurable operators. Let $S_0(\mathcal{M},\tau)$ be the ${}^*$-algebra of all $\tau$-compact operators and
$T(\mathcal{M},\tau
On normal $\tau$-measurable operators affiliated with semifinite von Neumann algebrasOn normal $\tau$-measurable operators affiliated with semifinite von Neumann algebras
Two classes of tau-measurable operators affiliated with a von Neumann algebraWe introduce two classes of tau-measurable operators affiliated with a von Neumann algebra.
On idempotent tau-measurable operators affiliated to a von Neumann algebraWe study idempotent tau-measurable operators affiliated to a von Neumann algebra
On the $\tau$-compactness of products of $\tau$-measurable operators adjoint to semi-finite von Neumann algebras
of certain nonnegative $\tau$-measurable operators. We state sufficient conditions of the $\tau$-compactness
The topologies of local convergence
in measure on the algebra of measurable operators semifinite trace $\tau$ on $M$, denote by $S(M, \tau)$ the *-algebra of $\tau$-measurable operators. We
On τ-Compactness of Products of τ-Measurable Operators establish some sufficient τ-compactness conditions for products of selfadjoint τ-measurable operators. Next
Сходимость по мере и $\tau$-компактность $\tau$-измеримых операторов, ассоциированных с полуконечной алгеброй фон НейманаИсследована сходимость по мере и $\tau$-компактность $\tau$-измеримых операторов, ассоциированных
On τ-Compactness of Products of τ-Measurable Operators establish some sufficient τ-compactness conditions for products of selfadjoint τ-measurable operators. Next
On normal τ-measurable operators affiliated with semifinite von Neumann algebras-measurable operators are obtained; it is established that: 1) each τ-compact q-hyponormal operator is normal; 2) if a τ
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