Solvable Lie algebras derived from Lie hyperalgebras

Abstract

Recently in s-n, we have investigated Lie algebras and abelian Lie algebras derived from Lie hyperalgebras using the fundamental relations L and A, respectively. In the present paper, continuing this method we obtain solvable Lie algebras from Lie hyperalgebras by Sn-relations. We show that n≥ 1S*n is the smallest equivalence relation on a Lie hyperalgebra such that the quotient structure is a solvable Lie algebra. We also provide some necessary and sufficient conditions for transitivity of the relation Sn using the notion of Sn-part.