Classification of flat Lorentzian nilpotent Lie algebras

IF 0.8 3区数学 Q2 MATHEMATICS Bulletin of the London Mathematical Society Pub Date : 2024-04-19 DOI:10.1112/blms.13047

Ignacio Bajo, Saïd Benayadi, Hicham Lebzioui

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Abstract

We give a complete classification of flat Lorentzian nilpotent Lie algebras, this is to say of pseudo-Euclidean Lie algebras associated to nilpotent Lie groups endowed with a left-invariant Lorentzian metric of vanishing curvature. We prove that every such a Lie algebra is a direct sum of an indecomposable flat Lorentzian Lie algebra and an abelian Euclidean summand and show that, if $h_{2 k + 1}$ denotes the $2 k + 1$ -dimensional Heisenberg Lie algebra, then the only non-abelian Lie algebras admitting flat Lorentzian metrics which are indecomposable are $h_{3}$ and the semidirect products $N_{1} (k) = R ⋉_{F_{1}} h_{2 k + 1}$ and $N_{2} (k) = R ⋉_{F_{2}} (h_{2 k + 1} \oplus R)$ , defined by some particular derivations $F_{1}, F_{2}$ . In all those cases we also find the equivalence classes of flat Lorentzian products.

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平洛伦兹零能列代数的分类

我们给出了扁平洛伦兹零能李代数的完整分类，也就是与赋有左不变洛伦兹曲率消失度量的零能李群相关的伪欧几里得李代数的完整分类。我们证明了每一个这样的李代数都是一个不可分解的平洛伦兹李代数和一个无性欧几里得和的直接和，并证明了，如果表示-维海森堡李代数，那么唯一不可分解的容许平洛伦兹度量的非阿贝尔李代数是和的半直接积和，它们是由一些特定的推导定义的。在所有这些情况下，我们还可以找到平洛伦兹积的等价类。

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