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Displaying 221 – 240 of 497

Invarianz gewisser Operatorenklassen unter nichtkommutativen ergodischen Mitteln.

Jürgen Tischer, Hans Wittmer (1974)

Manuscripta mathematica

Invertibility of the commutator of an element in a C*-algebra and its Moore-Penrose inverse

Julio Benítez, Vladimir Rakočević (2010)

Studia Mathematica

We study the subset in a unital C*-algebra composed of elements a such that $a a^{†} - a a^{†}$ is invertible, where $a^{†}$ denotes the Moore-Penrose inverse of a. A distinguished subset of this set is also investigated. Furthermore we study sequences of elements belonging to the aforementioned subsets.

Invertibility-preserving maps of $C^{*}$ -algebras with real rank zero.

Kovacs, Istvan (2005)

Abstract and Applied Analysis

Invitation à la théorie des algèbres stellaires

Alain Goullet de Rugy (1969/1970)

Séminaire Choquet. Initiation à l'analyse

Isometries between C*-algebras

Cho-Ho Chu, Ngai-Ching Wong (2004)

Revista Matemática Iberoamericana

Isometries between groups of invertible elements in C*-algebras

Osamu Hatori, Keiichi Watanabe (2012)

Studia Mathematica

We describe all surjective isometries between open subgroups of the groups of invertible elements in unital C*-algebras. As a consequence the two C*-algebras are Jordan *-isomorphic if and only if the groups of invertible elements in those C*-algebras are isometric as metric spaces.

Isometries of Banach Algebras Satisfying the von Neumann Inequality.

Jonathan Arazy (1994)

Mathematica Scandinavica

Isometries of the unitary groups in C*-algebras

Osamu Hatori (2014)

Studia Mathematica

We give a complete description of the structure of surjective isometries between the unitary groups of unital C*-algebras. While any surjective isometry between the unitary groups of von Neumann algebras can be extended to a real-linear Jordan *-isomorphism between the relevant von Neumann algebras, this is not the case for general unital C*-algebras. We show that the unitary groups of two C*-algebras are isomorphic as metric groups if and only if the C*-algebras are isomorphic in the sense that...

Isomorphic groupoid $C^{*}$ -algebras associated with different Haar systems.

Buneci, Mădălina Roxana (2005)

The New York Journal of Mathematics [electronic only]

Isomorphisms and generalized derivations in proper $C Q^{*}$ -algebras.

Park, Choonkil, Boo, Deok-Hoon (2011)

The Journal of Nonlinear Sciences and its Applications

Isomorphisms of Hilbert C-modules and -isomorphisms of related operator C*-algebras.

Michael Frank (1997)

Mathematica Scandinavica

Iterating the Pimsner construction.

Deaconu, Valentin (2007)

The New York Journal of Mathematics [electronic only]

JB algebras with an exceptional ideal.

H. Behncke, W. Bös (1978)

Mathematica Scandinavica

Jordan Axioms for C*-Algebras.

Angel Rodriguez Palacios (1988)

Manuscripta mathematica

Jordan -derivation pairs and quadratic functionals on modules over -rings.

B. Zalar (1997)

Aequationes mathematicae

$K$ -théorie bivariante de Kasparov

Thierry Fack (1982/1983)

Séminaire Bourbaki

K-Groups of Toeplitz Algebras of Reinhardt Domains.

Albert Jeu-Liang Sheu (1994)

Mathematica Scandinavica

Korovkin theory in Banach $^{*}$ -algebras

Ferdinand Beckhoff (1993)

Mathematica Slovaca

Korovkin theory in normed algebras

Ferdinand Beckhoff (1991)

Studia Mathematica

If A is a normed power-associative complex algebra such that the selfadjoint part is normally ordered with respect to some order, then the Korovkin closure (see the introduction for definitions) of T ∪ {t* ∘ t| t ∈ T} contains J*(T) for any subset T of A. This can be applied to C*-algebras, minimal norm ideals on a Hilbert space, and to H*-algebras. For bounded H*-algebras and dual C*-algebras there is even equality. This answers a question posed in [1].

K-гомологии $C^{*}$ -алгебр

В.М. Мануйлов (1988)

Matematiceskij sbornik

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