About nilalgebras satisfying (xy)2 = x 2 y 2

Behn, A.; Correa, I.; Gutierrez Fernandez, J.C.; Garcia, C.I.

About nilalgebras satisfying (xy)2 = x 2 y 2

Files

About nilalgebras satisfying (xy)2 = x2y2.pdf(124.68 KB)

Date

2021

Authors

Behn, A.

Correa, I.

Gutierrez Fernandez, J.C.

Garcia, C.I.

Publisher

Bellwether Publishing, Ltd.

Abstract

© 2021 Taylor & Francis Group, LLC.A classical problem in nonassociative algebras involves the existence of simple finite-dimensional commutative nilalgebras. In this paper, we study the class Ω of nonassociative algebras satisfying the identity (Formula presented.) over a field of characteristic different from 2 and 3. We show that every unitary algebra in Ω is associative. Next, we prove that each prime algebra in Ω is either associative or its center vanishes. For nilalgebras, we obtain that every nilalgebra in Ω is an Engel algebra. Finally, we show that every commutative nilalgebra in Ω of nilindex 4 over a field of characteristic not 2, 3 and 5 is solvable of index (Formula presented.).

Keywords

Albert’s problem, commutative algebras, finite-dimensional algebras, PI-algebras

URI

https://doi.org/10.1080/00927872.2021.1903024
https://repositorio.uc.cl/handle/11534/78927

Collections

Artículos de revistas

Full item page