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Subjects
17-XX Nonassociative rings and algebras
17Bxx Lie algebras and Lie superalgebras
17B50 Modular Lie (super)algebras

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La presque-périodicité et les coalgèbres injectives

Andrew Tonge (1980)

Studia Mathematica

Leibniz $A$ -algebras

David A. Towers (2020)

Communications in Mathematics

A finite-dimensional Lie algebra is called an $A$ -algebra if all of its nilpotent subalgebras are abelian. These arise in the study of constant Yang-Mills potentials and have also been particularly important in relation to the problem of describing residually finite varieties. They have been studied by several authors, including Bakhturin, Dallmer, Drensky, Sheina, Premet, Semenov, Towers and Varea. In this paper we establish generalisations of many of these results to Leibniz algebras.

Lie algebras

George Seligman (1987)

Beiträge zur Algebra und Geometrie = Contributions to algebra and geometry

Lie-Algebren mit Idealisatorbedingung

Walther Unsin (1973)

Rendiconti del Seminario Matematico della Università di Padova

Currently displaying 1 – 4 of 4