On a problem by Nathan Jacobson for Malcev algebras
Abstract
In this paper we solve a problem for a certain class of Malcev algebras, which is an analogous of an old problem posed by Nathan Jacobson for alternative algebras. Specifically we prove a coordinatization theorem for a class of Malcev algebras containing the 3-dimensional simple Lie algebra s l2(F) such that m\,s l2(F)≠ 0 for any 0≠ m∈M. We drop the last condition and we describe the structure of the same class of Malcev algebras M that contains s l2(F).
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