On the equivalence of all notions of generalized derivations whose domain is a C-algebra

Abstract

Let M be a Banach bimodule over an associative Banach algebra A, and let F: A M be a linear mapping. Three main uses of the term generalized derivation are identified in the available literature, namely, () F is a generalized derivation of the first type if there exists a derivation d : A M** satisfying F(a b ) = F(a) b + a d(b), for all a,b∈ A. () F is a generalized derivation of the second type if there exists an element ∈ M** satisfying F(a b ) = F(a) b + a F(b) - a b, for all a,b∈ A. () F is a generalized derivation of the third type if there exist two (non-necessarily linear) mappings G,H : A M satisfying F(a b ) = G(a) b + a H(b), for all a,b∈ A. These three types of maps are not, in general, equivalent. Although the first two notions are well studied when A is a C*-algebra, their connections with the third one have not yet been explored. In this note we prove that every generalized derivation of the third type from a C*-algebra A to a Banach A-bimodule M is automatically continuous. We also show that every (continuous) generalized derivation of the third type from A to M is a generalized derivation of the first and second type. Consequently, the three notions coincide in this case. We also explore some concepts of generalized Jordan derivations on a C*-algebra and establish some continuity properties for them.