Generalized derivations on unital algebras determined by action on zero products

Let A be a unital algebra having a nontrivial idempotent and let M be a unitary A-bimodule. We consider linear maps F,G:A→M satisfying F(x)y+xG(y)=0 whenever x,y∈A are such that xy=0. For example, when A is zero product determined algebra (e.g. algebra generated by idempotents) F and G are generaliz...

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Bibliographic Details
Published in	Linear algebra and its applications Vol. 445; pp. 347 - 368
Main Authors	Benkovič, Dominik, Grašič, Mateja
Format	Journal Article
Language	English
Published	Elsevier Inc 15.03.2014
Subjects	Derivation Generalized derivable mapping at zero point Generalized derivation Triangular algebra Unital algebra Zero product determined algebra Generalized derivation Derivation 16W25 Generalized derivable mapping at zero point Zero product determined algebra Unital algebra Triangular algebra
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