Kronecker factorization theorems for the exceptional Malcev algebra

Abstract

We prove that a Malcev algebra M containing the 7-dimensional simple non-Lie Malcev algebra M such that mM≠ 0 for any m≠ 0 from M, is isomorphic to MF U, where U is a certain commutative associative algebra. Also, we prove that a Malcev superalgebra M=M0 M1 whose even part M0 contains M with mM≠ 0 for any homogeneous element 0≠ m∈ M0 M1, is isomorphic to MFU, where U is a certain supercommutative associative superalgebra.