On the structure of graded 3-Leibniz algebras

Abstract

We study the structure of a 3-Leibniz algebra T graded by an arbitrary abelian group G, which is considered of arbitrary dimension and over an arbitrary base field . We show that T is of the form T=ΣjIj, with a linear subspace of T1, the homogeneous component associated to the unit element 1 in G, and any Ij a well described graded ideal of T, satisfying [Ij, T, Ik] = [Ij, Ik, T] = [T, Ij, Ik] = 0, if j≠ k. In the case of T being of maximal length, we characterize the gr-simplicity of the algebra in terms of connections in the support of the grading.