ON DERIVATIONS OF AW*-ALGEBRAS

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概要

• 論文の詳細を見る

• Some elementary results on derivations of continuous fields of C*-algebras are used to prove that every derivation of an AW*-algebra of type III (or of type I) is inner, and also that if a given quotient of an AW*-algebra is known to have only inner derivations, its tensor product with a separable commutative C*-algebra with unit also has this property.

• 東北大学大学院理学研究科数学専攻の論文

著者

• Elliott George

  Mathematics Institute University Of Copenhagen

関連論文

• Some Simple C$^\ast$ Algebras Constructed As Crosses Products with Discrete Outer Automorphism Groups
• Derivations Determined by Multipliers on Ideals of a $C^*$-Algebra
• On the Definition of $C^*$-algebras
• Strong topological transitivity and C*-dynamical systems
• Quasi-product actions of a compact abelian group on a C^*-algebra
• The Characterization of Differential Operators by Locality: Dissipations and Ellipticity
• ON DERIVATIONS OF AW*-ALGEBRAS

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