A Class of Generalized Derivations

We consider a class of generalized derivations that arise in connection with the problem of adjoining unity to an algebra with generalized derivation, and of searching envelopes for Novikov-Poisson algebras. Conditions for the existence of the localization of an algebra with ternary derivation are specified, as well as conditions under which given an algebra with ternary derivation, we can construct a Novikov-Poisson algebra and a Jordan superalgebra. Finally, we show how the simplicity of an algebra with Bresar generalized derivation is connected with simplicity of the appropriate Novikov algebra.

Automated summary

We consider a class of generalized derivations related to the problem of adding unity to an algebra with generalized derivation and searching for envelopes for Novikov-Poisson algebras. We specify conditions for the existence of the localization of an algebra with ternary derivation, as well as conditions for constructing a Novikov-Poisson algebra and a Jordan superalgebra given an algebra with ternary derivation. Finally, we establish the connection between the simplicity of an algebra with Bresar generalized derivation and the simplicity of the appropriate Novikov algebra.