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Recent results of M. Junge and Q. Xu on the ergodic properties of the averages of kernels in noncommutative $L^{p}$ -spaces are applied to the analysis of almost uniform convergence of operators induced by convolutions on compact quantum groups.

On homomorphisms of projective lattices in complex Hilbert spaces

A. Paszkiewicz (1980)

Colloquium Mathematicae

On individual subsequential ergodic theorem in von Neumann algebras

Semyon Litvinov, Farrukh Mukhamedov (2001)

Studia Mathematica

We use a non-commutative generalization of the Banach Principle to show that the classical individual ergodic theorem for subsequences generated by means of uniform sequences can be extended to the von Neumann algebra setting.

On limits of $L_{p}$ -norms of linear operators

Pavel Stavinoha (1982)

Czechoslovak Mathematical Journal

On stability properties of positive contractions of L¹-spaces associated with finite von Neumann algebras

Farrukh Mukhamedov, Hasan Akin, Seyit Temir (2006)

Colloquium Mathematicae

We extend the notion of Dobrushin coefficient of ergodicity to positive contractions defined on the L¹-space associated with a finite von Neumann algebra, and in terms of this coefficient we prove stability results for L¹-contractions.

On the Choquet and Bishop-de Leeuw theorems

Silviu Teleman (1982)

Banach Center Publications

On the convergence of operators

Beáta Stehlíková (1988)

Mathematica Slovaca

On the extension problem for unbounded measures on projections

G. D. Lugovaya, A. N. Sherstnev (2000)

Mathematica Slovaca

On the Lebesgue decomposition of Gleason measures

Vladimír Palko (1987)

Časopis pro pěstování matematiky

On the Lebesgue decomposition of the normal states of a JBW-algebra

Jacques Dubois, Brahim Hadjou (1992)

Mathematica Bohemica

In this article, a theorem is proved asserting that any linear functional defined on a JBW-algebra admits a Lebesque decomposition with respect to any normal state defined on the algebra. Then we show that the positivity (and the unicity) of this decomposition is insured for the trace states defined on the algebra. In fact, this property can be used to give a new characterization of the trace states amoungst all the normal states.

Operators from C*-algebras to Banach Spaces.

J.D. Maitland Wright (1980)

Mathematische Zeitschrift

Order Derivations on Lp-Spaces of W*-Algebras.

Lothar M. Schmitt (1987)

Mathematische Zeitschrift

Order properties of compact maps on L...-spaces associated with von Neumann algebras.

Erwin Neuhardt (1990)

Mathematica Scandinavica

Orlicz spaces associated with a semi-finite von Neumann algebra

Sh. A. Ayupov, V. I. Chilin, R. Z. Abdullaev (2012)

Commentationes Mathematicae Universitatis Carolinae

Let $M$ be a von Neumann algebra, let $ϕ$ be a weight on $M$ and let $Φ$ be $N$ -function satisfying the $(δ_{2}, Δ_{2})$ -condition. In this paper we study Orlicz spaces, associated with $M$ , $ϕ$ and $Φ$ .

Orthogonal scalar products on von Neumann algebras

Stanisław Goldstein (1984)

Studia Mathematica

Orthogonal vector measures on projection lattices in a Hilbert space

Jan Hamhalter (1990)

Commentationes Mathematicae Universitatis Carolinae

Outers for noncommutative $H^{p}$ revisited

David P. Blecher, Louis E. Labuschagne (2013)

Studia Mathematica

We continue our study of outer elements of the noncommutative $H^{p}$ spaces associated with Arveson’s subdiagonal algebras. We extend our generalized inner-outer factorization theorem, and our characterization of outer elements, to include the case of elements with zero determinant. In addition, we make several further contributions to the theory of outers. For example, we generalize the classical fact that outers in $H^{p}$ actually satisfy the stronger condition that there exist aₙ ∈ A with haₙ ∈ Ball(A)...

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