On the determination of 2-step solvable Lie algebra from its weight graph

Abstract

By using the concept of weight graph associated to certain nilpotent Lie algebras g, we find necessary and sufficient conditions for a semidirect product g Ti, where Ti<T is a subalgebra of a maximal torus of derivations T of g which induces a decomposition of g into one dimensional weight spaces, to be 2-step solvable. In particular we show that the semidirect product of such a Lie algebra with its torus of derivations cannot be itself 2-step solvable.

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