Identities of the left-symmetric Witt algebras

Daniyar Kozybaev; Ualbai Umirbaev

arXiv:1508.04668·math.RA·January 3, 2020·Int. J. Algebra Comput.

Identities of the left-symmetric Witt algebras

Daniyar Kozybaev, Ualbai Umirbaev

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TL;DR

This paper characterizes the identities of the left-symmetric Witt algebras of polynomial derivations and shows they generate the entire variety of left-symmetric algebras, providing a comprehensive algebraic description.

Contribution

It describes all right operator identities of the left-symmetric Witt algebras and proves these algebras generate the variety of all left-symmetric algebras, including general identities.

Findings

01

All right operator identities of al{L}_n are described.

02

The set of al{L}_n} generates the variety of all left-symmetric algebras.

03

A class of general identities for al{L}_n is established.

Abstract

Let $P_{n} = k [x_{1}, x_{2}, \dots, x_{n}]$ be the polynomial algebra over a field $k$ of characteristic zero in the variables $x_{1}, x_{2}, \dots, x_{n}$ and $L_{n}$ be the left-symmetric Witt algebra of all derivations of $P_{n}$ . We describe all right operator identities of $L_{n}$ and prove that the set of all algebras $L_{n}$ , where $n \geq 1$ , generates the variety of all left-symmetric algebras. We also describe a class of general (not only right operator) identities for $L_{n}$ .

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Taxonomy

TopicsAdvanced Topics in Algebra · Algebraic structures and combinatorial models · Advanced Differential Equations and Dynamical Systems