Your search keyword '"46M10"' showing total 8 results

1. Unique expectations for discrete crossed products

Author

Vrej Zarikian

Subjects

Pure mathematics, Control and Optimization, Inclusion (disability rights), Discrete group, media_common.quotation_subject, crossed product $C^{*}$-algebra, simplicity, 46L07, Conditional expectation, 01 natural sciences, Mathematics::Group Theory, 47L65, 46L07, 46M10, conditional expectation, 0103 physical sciences, FOS: Mathematics, 47L65, Simplicity, 0101 mathematics, Operator Algebras (math.OA), media_common, Mathematics, Algebra and Number Theory, Mathematics::Operator Algebras, 46M10, Unital, 010102 general mathematics, Mathematics - Operator Algebras, injective envelope, pseudoexpectation, 010307 mathematical physics, Analysis

Abstract

Let $G$ be a discrete group acting on a unital $C^*$-algebra $\mathcal{A}$ by $*$-automorphisms. We characterize (in terms of the dynamics) when the inclusion $\mathcal{A} \subseteq \mathcal{A} \rtimes_r G$ has a unique conditional expectation, and when it has a unique pseudo-expectation (in the sense of Pitts). Likewise for the inclusion $\mathcal{A} \subseteq \mathcal{A} \rtimes G$. As an application, we (slightly) strengthen results of Kishimoto and Archbold-Spielberg concerning $C^*$-simplicity of $\mathcal{A} \rtimes_r G$.

Published

2019

2. Which compacta are noncommutative ARs?

Author

Alex Chigogidze and Alexander Dranishnikov

Subjects

Pure mathematics, Dimension (graph theory), 01 natural sciences, Mathematics - Geometric Topology, Retract, 0103 physical sciences, FOS: Mathematics, 0101 mathematics, Algebra over a field, Operator Algebras (math.OA), 10. No inequality, Commutative property, Mathematics, Projective C∗-algebra, 46M10, Unital, 010102 general mathematics, Mathematics - Operator Algebras, Short answer, Geometric Topology (math.GT), Absolute retract, 16. Peace & justice, Dendrit, Noncommutative geometry, 010307 mathematical physics, Geometry and Topology

Abstract

We give a short answer to the question in the title: {\em dendrits}. Precisely we show that the $C^{\ast}$-algebra $C(X)$ of all complex-valued continuous functions on a compactum $X$ is projective in the category ${\mathcal C}^{1}$ of all (not necessarily commutative) unital $C^{\ast}$-algebras if and only if $X$ is an absolute retract of dimension $\dim X \leq 1$ or, equivalently, that $X$ is a dendrit., 8 pages

Published

2010

3. Hereditary properties of character injectivity with applications to semigroup algebras

Author

M. Essmaili, Mohammad Fozouni, and Javad Laali

Subjects

Pure mathematics, $\phi$-amenability, Mathematics::Functional Analysis, Control and Optimization, Algebra and Number Theory, Semigroup, 46H25, Injectivity, semigroup algebras, 46M10, 46M10, 43A20, 46H25, $\phi$-injectivity, Functional Analysis (math.FA), Mathematics - Functional Analysis, Character (mathematics), 43A20, FOS: Mathematics, Commutative property, Analysis, Mathematics

Abstract

In this paper, we investigate the notion $\phi$-injectivity for Banach $A$-modules, where $\phi$ is a character on $A.$ We obtain some hereditary properties of $\phi$-injectivity for certain classes of Banach modules related to closed ideals. These results allow us to study $\phi$-injectivity of certain Banach $A$-modules in commutative case, specially $\ell^{1}$-semilattice algebras. As an application, we give an example of a non-injective Banach module which is $\phi$-injective for each character $\phi.$, Comment: 10 pages, To appear in "Annals of Functional Analysis"

Published

2015

4. Unique pseudo-expectations for $C^{*}$-inclusions

Author

David R. Pitts and Vrej Zarikian

Subjects

46L05, Singleton, 46L10, General Mathematics, 46M10, Convex set, Mathematics - Operator Algebras, 46L05, 46L07, 46L10 (Primary), 46M10 (Secondary), Type (model theory), Characterization (mathematics), 46L07, Injective function, Combinatorics, FOS: Mathematics, Uniqueness, Abelian group, Operator Algebras (math.OA), Unit (ring theory), Mathematics

Abstract

Given an inclusion D $\subseteq$ C of unital C*-algebras, a unital completely positive linear map $\Phi$ of C into the injective envelope I(D) of D which extends the inclusion of D into I(D) is a pseudo-expectation. The set PsExp(C,D) of all pseudo-expectations is a convex set, and for abelian D, we prove a Krein-Milman type theorem showing that PsExp(C,D) can be recovered from its extreme points. When C is abelian, the extreme pseudo-expectations coincide with the homomorphisms of C into I(D) which extend the inclusion of D into I(D), and these are in bijective correspondence with the ideals of C which are maximal with respect to having trivial intersection with D. Natural classes of inclusions have a unique pseudo-expectation (e.g., when D is a regular MASA in C). Uniqueness of the pseudo-expectation implies interesting structural properties for the inclusion. For example, when D $\subseteq$ C $\subseteq$ B(H) are W*-algebras, uniqueness of the pseudo-expectation implies that D' $\cap$ C is the center of D; moreover, when H is separable and D is abelian, we characterize which W*-inclusions have the unique pseudo-expectation property. For general inclusions of C*-algebras with D abelian, we characterize the unique pseudo-expectation property in terms of order structure; and when C is abelian, we are able to give a topological description of the unique pseudo-expectation property. Applications include: a) if an inclusion D $\subseteq$ C has a unique pseudo-expectation $\Phi$ which is also faithful, then the C*-envelope of any operator space X with D $\subseteq$ X $\subseteq$ C is the C*-subalgebra of C generated by X; b) for many interesting classes of C*-inclusions, having a faithful unique pseudo-expectation implies that D norms C. We give examples to illustrate the theory, and conclude with several unresolved questions., Comment: 26 pages

Published

2015

5. Continuous homomorphisms of Arens-Michael algebras

Author

Alex Chigogidze

Subjects

Discrete mathematics, Pure mathematics, Mathematics::Functional Analysis, 46H05, 46M10, lcsh:Mathematics, 010102 general mathematics, Subalgebra, Mathematics::General Topology, lcsh:QA1-939, 01 natural sciences, Functional Analysis (math.FA), 010101 applied mathematics, Mathematics - Functional Analysis, Mathematics (miscellaneous), Limit (category theory), Morphism, Product (mathematics), FOS: Mathematics, Uncountable set, Homomorphism, 0101 mathematics, Mathematics

Abstract

It is shown that every continuous homomorphism of Arens-Michael algebras can be obtained as the limit of a morphism of certain projective systems consisting of Fr\'{e}chet algebras. Based on this we prove that a complemented subalgebra of an uncountable product of Fr\'{e}chet algebras is topologically isomorphic to the product of Fr\'{e}chet algebras. These results are used to characterize injective objects of the category of locally convex topological vector spaces. Dually, it is shown that a complemented subspace of an uncountable direct sum of Banach spaces is topologically isomorphic to the direct sum of ({\bf LB})-spaces. This result is used to characterize projective objects of the above category., Comment: 25 pages

Published

2003

6. Extreme flatness of normed modules and Arveson-Wittstock type theorems

Author

Helemskii, A. Ya.

Subjects

Mathematics - Functional Analysis, Mathematics::Functional Analysis, 46M05, Mathematics::Operator Algebras, 46M10, 47L25, FOS: Mathematics, 46L07, Functional Analysis (math.FA)

Abstract

We show in this paper that a certain class of normed modules over the algebra of all bounded operators on a Hilbert space possesses a homological property which is a kind of a functional-analytic version of the standard algebraic property of flatness. We mean the preservation, under projective tensor multiplication of modules, of the property of a given morphism to be isometric. As an application, we obtain several extension theorems for different types of modules, called Arveson-Wittstock type theorems. These, in their turn, have, as a straight corollary, the `genuine' Arveson-Wittstock Theorem in its non-matricial presentation. We recall that the latter theorem plays the role of a `quantum' version of the classical Hahn-Banach theorem on the extension of bounded linear functionals. It was originally proved by Wittstock (1981), and a crucial preparatory step was done by Arveson (1969)., 19 pages

Published

2008

7. $H^1$-Projective Banach Spaces

Author

Kouba, Omran

Subjects

Mathematics - Functional Analysis, Mathematics::Functional Analysis, 46M05, 46M10, FOS: Mathematics, 46B08, Functional Analysis (math.FA)

Abstract

We study the $H^1$-projective Banach spaces. We prove that they have the Analytic Radon-Nikodym Property, and that they are cotype 2 spaces which satisfy Grothendieck's Theorem. We show also that the ultraproduct of $H^1$-projective spaces is $H^1$-projective. Other results are also discussed., 17 pages

Published

2004

8. Multipliers of operator spaces, and the injective envelope

Author

David P. Blecher and Vern I. Paulsen

Subjects

Discrete mathematics, Pure mathematics, General Mathematics, 46M10, Mathematics - Operator Algebras, Finite-rank operator, Shift operator, Compact operator, Strictly singular operator, Quasinormal operator, Functional Analysis (math.FA), 47D15, Semi-elliptic operator, Mathematics - Functional Analysis, Weak operator topology, Multiplication operator, FOS: Mathematics, Operator Algebras (math.OA), Mathematics

Abstract

We study the injective envelope I(X) of an operator space X, showing amongst other things that it is a self-dual C$^*-$module. We describe the diagonal corners of the injective envelope of the canonical operator system associated with X. We prove that if X is an operator $A-B$-bimodule, then A and B can be represented completely contractively as subalgebras of these corners. Thus, the operator algebras that can act on X are determined by these corners of I(X) and consequently bimodules actions on X extend naturally to actions on I(X). These results give another characterization of the multiplier algebra of an operator space, which was introduced by the first author, and a short proof of a recent characterization of operator modules, and a related result. As another application, we extend Wittstock's module map extension theorem, by showing that an operator $A-B$-bimodule is injective as an operator $A-B$-bimodule if and only if it is injective as an operator space., Comment: Revised version, January 21 2000

Published

1999