Generalized derivations of ω-Lie algebras
Abstract
This article explores the structure theory of compatible generalized derivations of finite-dimensional ω-Lie algebras over a field K. We prove that any compatible quasiderivation of an ω-Lie algebra can be embedded as a compatible derivation into a larger ω-Lie algebra, refining the general result established by Leger and Luks in 2000 for finite-dimensional nonassociative algebras. We also provide an approach to explicitly compute (compatible) generalized derivations and quasiderivations for all 3-dimensional non-Lie complex ω-Lie algebras.
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