We prove that every generalized Jordan derivation D from a JB*-algebra A into itself or into its dual space is automatically continuous. In particular, we establish that every generalized Jordan derivation from a C*-algebra to a Jordan Banach module is continuous. As a consequence, every generalized derivation from a C*-algebra to a Banach bimodule is continuous.Keywords: Jordan Banach algebra, Jordan Banach module, JB*-algebra, Jordan derivation, generalized Jordan derivation, automatic continuit
We show that left derivations as well as Jordan derivations on locally $C^{*}$-algebras are always c...
AbstractWe show that a derivation of a C∗-algebra A is automatically relative bounded with respect t...
It is a question of general interest whether, on a given Banach algebra A, there is any discontinuou...
We introduce the notion of Banach Jordan triple modules and determine the precise conditions under w...
We establish that all derivations on a semisimple Jordan-Banach algebra are automatically continuous...
Abstract. We investigate the continuity of (; )-derivations on B(X) or C-algebras. We give some suff...
AbstractLet A be an algebra and M be an A-bimodule. Let X be in A and δ:A→M be a linear map which sa...
AbstractConditions are given for Banach algebras U and commutative Banach algebras B which insure th...
Abstract. Let A be a Banach algebra and M be a Banach A-bimodule. We say that a linear mapping δ: A ...
Abstract. Let A be a Banach algebra and let every module-valued derivation from A to any Banach A-bi...
Abstract. We show that every strong approximate one-to-one Jordan functional on an algebra is a Jord...
1. Let be a Banach algebra. We say that homomorphisms from are continuous if every homomorphism from...
R. V. Kadison (J. Algebra 130 (1990) 494–509) defined the notion of local derivation on an algebra a...
Let A be an algebra. A sequence {dn} of linear mappings on A is called a higher derivation if dn(ab)...
The main topic of the paper is the continuity of several kinds of generalized inversion of elements ...
We show that left derivations as well as Jordan derivations on locally $C^{*}$-algebras are always c...
AbstractWe show that a derivation of a C∗-algebra A is automatically relative bounded with respect t...
It is a question of general interest whether, on a given Banach algebra A, there is any discontinuou...
We introduce the notion of Banach Jordan triple modules and determine the precise conditions under w...
We establish that all derivations on a semisimple Jordan-Banach algebra are automatically continuous...
Abstract. We investigate the continuity of (; )-derivations on B(X) or C-algebras. We give some suff...
AbstractLet A be an algebra and M be an A-bimodule. Let X be in A and δ:A→M be a linear map which sa...
AbstractConditions are given for Banach algebras U and commutative Banach algebras B which insure th...
Abstract. Let A be a Banach algebra and M be a Banach A-bimodule. We say that a linear mapping δ: A ...
Abstract. Let A be a Banach algebra and let every module-valued derivation from A to any Banach A-bi...
Abstract. We show that every strong approximate one-to-one Jordan functional on an algebra is a Jord...
1. Let be a Banach algebra. We say that homomorphisms from are continuous if every homomorphism from...
R. V. Kadison (J. Algebra 130 (1990) 494–509) defined the notion of local derivation on an algebra a...
Let A be an algebra. A sequence {dn} of linear mappings on A is called a higher derivation if dn(ab)...
The main topic of the paper is the continuity of several kinds of generalized inversion of elements ...
We show that left derivations as well as Jordan derivations on locally $C^{*}$-algebras are always c...
AbstractWe show that a derivation of a C∗-algebra A is automatically relative bounded with respect t...
It is a question of general interest whether, on a given Banach algebra A, there is any discontinuou...