The strong degree of von Neumann algebras and the structure of Lie and Jordan derivations

J. ALAMINOS; M. BREšAR; A. R. VILLENA

doi:10.1017/S0305004104007789

Abstract

The main theorem states that all Lie and Jordan derivations from a von Neumann algebra $\frak{A}$ into any Banach $\frak{A}$-bimodule are standard. Moreover, this statement is proved for some other classes of algebras. Our approach is based on the algebraic theory of functional identities and the strong degree, and is combined with analytic tools.

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The strong degree of von Neumann algebras and the structure of Lie and Jordan derivations

Abstract

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The strong degree of von Neumann algebras and the structure of Lie and Jordan derivations

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