Complete description of invariant, associative pseudo-Euclidean metrics on left Leibniz algebras via quadratic Lie algebras

Complete description of invariant, associative pseudo-Euclidean metrics on left Leibniz algebras via quadratic Lie algebras

A pseudo-Euclidean non-associative algebra (g,•) is a finite dimensional algebra over a field K that has a metric, i.e., a bilinear, symmetric, and non-degenerate form 〈,〉. The metric is considered L-invariant (resp. R-invariant) if all left multiplications (resp. right multiplications) are skew-sym...

Full description

Saved in:
Bibliographic Details
Published in:Journal of algebra Vol. 638; pp. 358 - 395
Main Authors: Abid, Fatima-Ezzahrae, Boucetta, Mohamed
Format: Journal Article
Language:English
Published: Elsevier Inc 15-01-2024
Subjects:
[formula omitted]-extension
Associative metrics
Double extension
Invariant metrics
Leibniz algebras
Associative metrics
T⁎-extension
Leibniz algebras
Invariant metrics
Double extension
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:A pseudo-Euclidean non-associative algebra (g,•) is a finite dimensional algebra over a field K that has a metric, i.e., a bilinear, symmetric, and non-degenerate form 〈,〉. The metric is considered L-invariant (resp. R-invariant) if all left multiplications (resp. right multiplications) are skew-symmetric. The metric is called associative if 〈u•v,w〉=〈u,v•w〉 for all u,v,w∈g. These three notions coincide when g is a Lie algebra and in this case g endowed with the metric is known as a quadratic Lie algebra. This paper provides a complete description of L-invariant, R-invariant, or associative pseudo-Euclidean metrics on left Leibniz algebras over a commutative field of characteristic zero. It shows that a left Leibniz algebra with an associative metric is also right Leibniz and can be obtained easily from its underlying Lie algebra, which is a quadratic Lie algebra. Additionally, it shows that at the core of a left Leibniz algebra endowed with a L-invariant or R-invariant metric, there are two Lie algebras with one quadratic and the left Leibniz algebra can be built from these Lie algebras. We derive many important results from these complete description. Finally, the paper provides a list of left Leibniz algebras with an associative metric up to dimension 6, as well as a list of left Leibniz algebras with an L-invariant metric, up to dimension 4, and R-invariant metric up to dimension 5.
ISSN:0021-8693
1090-266X
DOI:10.1016/j.jalgebra.2023.10.003