Split Regular Hom-Leibniz Color 3-Algebras

Abstract

We introduce and describe the class of split regular Hom-Leibniz color 3-algebras as the natural extension of the class of split Lie algebras, split Leibniz algebras, split Lie 3-algebras, split Lie triple systems, split Leibniz 3-algebras, and some other algebras. More precisely, we show that any of such split regular Hom-Leibniz color 3-algebras T is of the form T= U +ΣjIj, with U a subspace of the 0-root space T0, and Ij an ideal of T satisfying for j≠ k: \[[ T,Ij,Ik]+[Ij, T,Ik]+[Ij,Ik,T]=0.\] Moreover, if T is of maximal length, we characterize the simplicity of T in terms of a connectivity property in its set of non-zero roots.