A class of Locally Nilpotent Commutative Algebras

Antonio Behn; Alberto Elduque; and Alicia Labra

arXiv:0907.3569·math.RA·July 22, 2009·Int. J. Algebra Comput.

A class of Locally Nilpotent Commutative Algebras

Antonio Behn, Alberto Elduque, and Alicia Labra

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Abstract

This paper deals with the variety of commutative nonassociative algebras satisfying the identity $L_{x}^{3} + γ L_{x^{3}} = 0$ , $γ \in K$ . Correa et al proved that if $γ = 0, 1$ then any such finitely generated algebra is nilpotent. Here we generalize this result by proving that if $γ \neq = - 1$ , then any such algebra is locally nilpotent. Our results require characteristic $\neq = 2, 3$ .

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TopicsAdvanced Topics in Algebra · Rings, Modules, and Algebras · Algebraic structures and combinatorial models