Lie affgebras vis-\`a-vis Lie algebras

TL;DR

This paper establishes a correspondence between Lie affgebras and Lie algebras with additional data, enabling classification and embedding of Lie affgebras using Lie algebraic structures and automorphisms.

Contribution

It introduces a novel isomorphism between Lie affgebras and Lie algebras with a fixed element and derivation, facilitating their classification and analysis.

Findings

Lie affgebras are isomorphic to Lie algebras with an element and a generalized derivation.

Classification of complex Lie affgebras with simple fibers is achieved via scalar and automorphism classes.

All Lie affgebras with specific fibers are embedded in trivial extensions of their Lie algebra fibers.

Abstract

It is shown that any Lie affgebra, that is an algebraic system consisting of an affine space together with a bi-affine bracket satisfying affine versions of the antisymmetry and Jacobi identity, is isomorphic to a Lie algebra together with an element and a specific generalised derivation (in the sense of Leger and Luks, [G.F.\ Leger \& E.M.\ Luks, Generalized derivations of Lie algebras, {\em J.\ Algebra} {\bf 228} (2000), 165--203]). These Lie algebraic data can be taken for the construction of a Lie affgebra or, conversely, they can be uniquely derived for any Lie algebra fibre of the Lie affgebra. The close relationship between Lie affgebras and (enriched by the additional data) Lie algebras can be employed to attempt a classification of the former by the latter. In particular, up to isomorphism, a complex Lie affgebra with a simple Lie algebra fibre $\mathfrak{g}$ is fully determined by a scalar and an element of $\mathfrak{g}$ fixed up to an automorphism of $\mathfrak{g}$, and it can be universally embedded in a trivial extension of $\mathfrak{g}$ by a derivation. The study is illustrated by a number of examples that include all Lie affgebras with one-dimensional, nonabelian two-dimensional, $\mathfrak{s}\mathfrak{l}(2,\mathbb{C})$ and $\mathfrak{s}\mathfrak{o}(3)$ fibres. Extensions of Lie affgebras by cocycles and their relation to cocycle extensions of tangent Lie algebras is briefly discussed too.