Abstract
In this paper, we introduce the concepts of derivation of degree n, generalized derivation of degree n and ternary derivation of degree n, where n is a positive integer, and then we study the algebraic properties of these mappings. For instance, we study the image of derivations of degree n on algebras and in this regard we prove that, under certain conditions, every derivation of degree n on an algebra maps the algebra into its Jacobson radical. Also, we present some characterizations of these mappings on algebras. For example, under certain assumptions, we show that if f is an additive generalized derivation of degree n with an associated mapping d, then either f is a linear generalized derivation with the associated linear derivation d or f and d are identically zero. Some other related results are also established.
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