Leibniz algebras associated with representations of Euclidean Lie algebra

Abstract

In the present paper we describe Leibniz algebras with three-dimensional Euclidean Lie algebra e(2) as its liezation. Moreover, it is assumed that the ideal generated by the squares of elements of an algebra (denoted by I) as a right e(2)-module is associated to representations of e(2) in sl2(C) sl2(C), sl3(C) and sp4(C). Furthermore, we present the classification of Leibniz algebras with general Euclidean Lie algebra e(n) as its liezation I being an (n+1)-dimensional right e(n)-module defined by transformations of matrix realization of e(n). Finally, we extend the notion of a Fock module over Heisenberg Lie algebra to the case of Diamond Lie algebra Dk and describe the structure of Leibniz algebras with corresponding Lie algebra Dk and with the ideal I considered as a Fock Dk-module.