Abstract
A well-known theorem of E. Posner [10] states that if the composition d1d2 of derivations d1d2 of a prime ring A of characteristic not 2 is a derivation, then either d1 = 0 or d2 = 0. A number of authors have generalized this theorem in several ways (see e.g. [1], [2], and [5], where further references can be found). Under stronger assumptions when A is the algebra of all bounded linear operators on a Banach space (resp. Hilbert space), Posner's theorem was reproved in [3] (resp. [12]). Recently, M. Mathieu [8] extended Posner's theorem to arbitrary C*-algebras.
Publisher
Cambridge University Press (CUP)
Reference13 articles.
1. The Norm of a Derivation in a W ∗ -Algebra
2. On the range of a derivation
3. Derivations in prime rings
4. 8. Mathieu M. , Properties of the product of two derivations of a C*-algebra, to appear in Canad. Math. Bull.
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286 articles.
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