Leibniz triple systems admitting a multiplicative basis

Abstract

Let (T, ·, ·, · ) be a Leibniz triple system of arbitrary dimension, over an arbitrary base field F. A basis B = \ei\i ∈ I of T is called multiplicative if for any i,j,k ∈ I we have that ei,ej,ek∈ Fer for some r ∈ I. We show that if T admits a multiplicative basis then it decomposes as the orthogonal direct sum T= k Ik of well-described ideals Ik admitting each one a multiplicative basis. Also the minimality of T is characterized in terms of the multiplicative basis and it is shown that, under a mild condition, the above direct sum is by means of the family of its minimal ideals.