\delta-derivations of semisimple structurable algebras

Ivan Kaygorodov; Elizaveta Okhapkina

arXiv:1212.0618·math.RA·April 3, 2020

\delta-derivations of semisimple structurable algebras

Ivan Kaygorodov, Elizaveta Okhapkina

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TL;DR

This paper classifies all -derivations of semisimple structurable algebras over algebraically closed fields with characteristic not 2, 3, or 5, providing a comprehensive understanding of their derivation structure.

Contribution

It offers a complete description of -derivations in semisimple structurable algebras, a previously uncharacterized class.

Findings

01

All -derivations are explicitly described.

02

The classification holds over algebraically closed fields with characteristic ACA2A3A5.

03

The results extend understanding of derivations in structurable algebra theory.

Abstract

We described all \delta-derivations of semisimple f.-d. structurable algebras over algebraically closed field with characteritic is not equal 2,3,5.

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