It\o's theorem and metabelian Leibniz algebras

Abstract

We prove that the celebrated It\o's theorem for groups remains valid at the level of Leibniz algebras: if g is a Leibniz algebra such that g = A + B, for two abelian subalgebras A and B, then g is metabelian, i.e. [ \, [g, \, g], \, [ g, \, g ] \, ] = 0. A structure type theorem for metabelian Leibniz/Lie algebras is proved. All metabelian Leibniz algebras having the derived algebra of dimension 1 are described, classified and their automorphisms groups are explicitly determined as subgroups of a semidirect product of groups P* (k* × Autk (P) ) associated to any vector space P.