Conjugacy of Cartan Subalgebras in Solvable Leibniz Algebras and Real Leibniz Algebras

Abstract: ABSTRACT. We extend conjugacy results from Lie algebras to their Leibniz algebra generalizations. The proofs in the Lie case depend on anti-commutativity. Thus it is necessary to find other paths in the Leibniz case. Some of these results involve Cartan subalgebras. Our results can be used to extend other results on Cartan subalgebras. We show an example here and others will be shown in future work.Keywords: Leibniz algebras, Conjugacy, Cartan subalgebras, maximal subalgebras MSC 2010: 17A32 A self-centralizin… Show more

“…In recent years, the theory of Leibniz algebras has been intensively studied. During the last 30 years the theory of Leibniz algebras has been actively studied and many results on Lie algebras have been extended to Leibniz algebras (see for example [5,6,16,17,23,28,29]).…”

Classification of five-dimensional symmetric Leibniz algebras

“…In recent years, the theory of Leibniz algebras has been intensively studied. During the last 30 years the theory of Leibniz algebras has been actively studied and many results on Lie algebras have been extended to Leibniz algebras (see for example [5,6,16,17,23,28,29]).…”

Classification of five-dimensional symmetric Leibniz algebras

Classification of Five-Dimensional Symmetric Leibniz Algebras