Stability of (α,β,γ)-derivations on Lie C*-algebras

Abstract

Petr Novotn\'y and Jir\'l Hrivn\'ak Nov investigated generalize the concept of Lie derivations via certain complex parameters and obtained various Lie and Jordan operator algebras as well as two one- parametric sets of linear operators. Moreover, they established the structure and properties of (α,β,γ)-derivations of Lie algebras. We say a functional equation () is stable if any function g satisfying the equation () approximately is near to true solution of (). In the present paper, we investigate the stability of (α,β,γ)-derivations on Lie C*-algebras associated with the following functional equation f(x2-x13)+f(x1-3 x33)+ f(3x1+3x3-x23)=f(x1).