Perturbations of C*-algebraic Invariants

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Standard

Perturbations of C*-algebraic Invariants. / Christensen, Erik; Sinclair, Allan M.; Smith, Roger R.; White, Stuart.

I: Geometric and Functional Analysis, Bind 20, Nr. 2, 2010, s. 368 - 397.

Publikation: Bidrag til tidsskriftTidsskriftartikelForskningfagfællebedømt

Harvard

Christensen, E, Sinclair, AM, Smith, RR & White, S 2010, 'Perturbations of C*-algebraic Invariants', Geometric and Functional Analysis, bind 20, nr. 2, s. 368 - 397.

APA

Christensen, E., Sinclair, A. M., Smith, R. R., & White, S. (2010). Perturbations of C*-algebraic Invariants. Geometric and Functional Analysis, 20(2), 368 - 397.

Vancouver

Christensen E, Sinclair AM, Smith RR, White S. Perturbations of C*-algebraic Invariants. Geometric and Functional Analysis. 2010;20(2):368 - 397.

Author

Christensen, Erik ; Sinclair, Allan M. ; Smith, Roger R. ; White, Stuart. / Perturbations of C*-algebraic Invariants. I: Geometric and Functional Analysis. 2010 ; Bind 20, Nr. 2. s. 368 - 397.

Bibtex

@article{d351b580a14f11df928f000ea68e967b,
title = "Perturbations of C*-algebraic Invariants",
abstract = "The setting of the article is the so-called theory of perturbations of algebras of operators. It is shown that several of the properties a C*-algebra may have are preseved under pertubations. The main result states that Pisier's concept finite length is a stasble property.",
author = "Erik Christensen and Sinclair, {Allan M.} and Smith, {Roger R.} and Stuart White",
year = "2010",
language = "English",
volume = "20",
pages = "368 -- 397",
journal = "Geometric and Functional Analysis",
issn = "1016-443X",
publisher = "Springer Basel AG",
number = "2",

}

RIS

TY - JOUR

T1 - Perturbations of C*-algebraic Invariants

AU - Christensen, Erik

AU - Sinclair, Allan M.

AU - Smith, Roger R.

AU - White, Stuart

PY - 2010

Y1 - 2010

N2 - The setting of the article is the so-called theory of perturbations of algebras of operators. It is shown that several of the properties a C*-algebra may have are preseved under pertubations. The main result states that Pisier's concept finite length is a stasble property.

AB - The setting of the article is the so-called theory of perturbations of algebras of operators. It is shown that several of the properties a C*-algebra may have are preseved under pertubations. The main result states that Pisier's concept finite length is a stasble property.

M3 - Journal article

VL - 20

SP - 368

EP - 397

JO - Geometric and Functional Analysis

JF - Geometric and Functional Analysis

SN - 1016-443X

IS - 2

ER -

ID: 21234776