Leibniz algebras and graphs

Abstract

We consider a Leibniz algebra L = I V over an arbitrary base field F, being I the ideal generated by the products [x,x], x ∈ L. This ideal has a fundamental role in the study presented in our paper. A basis =\vi\i ∈ I of L is called multiplicative if for any i,j ∈ I we have that [vi,vj] ∈ Fvk for some k ∈ I. We associate an adequate graph ( L,) to L relative to . By arguing on this graph we show that L decomposes as a direct sum of ideals, each one being associated to one connected component of ( L,). Also the minimality of L and the division property of L are characterized in terms of the weak symmetry of the defined subgraphs ( L, I) and ( L, V).