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This paper examines whether the concept of an almost-algebraic Lie algebra developed by Auslander and Brezin in J. Algebra, 8 (1968), 295-313 can be introduced for Leibniz algebras. Two possible analogues are considered: almost-reductive and almost-algebraic Leibniz algebras. For Lie algebras these two concepts are the same, but that is not the case for Leibniz algebras, the class of almost-algebraic Leibniz algebras strictly containing that of the almost-reductive ones. Various properties of these two classes of algebras are obtained, together with some relationships between -free, elementary, E-algebras and A-algebras.
David A. Towers (Sat,) studied this question.