Simple Lie Algebras having Extremal Elements
Rings and Algebras
2011-06-17 v3
Abstract
Let L be a simple finite-dimensional Lie algebra of characteristic distinct from 2 and from 3. Suppose that L contains an extremal element that is not a sandwich, that is, an element x such that [x, [x, L]] is equal to the linear span of x in L. In this paper we prove that, with a single exception, L is generated by extremal elements. The result is known, at least for most characteristics, but the proofs in the literature are involved. The current proof closes a gap in a geometric proof that every simple Lie algebra containing no sandwiches (that is, ad-nilpotent elements of order 2) is in fact of classical type.
Cite
@article{arxiv.0711.4268,
title = {Simple Lie Algebras having Extremal Elements},
author = {Arjeh M. Cohen and Gabor Ivanyos and Dan A. Roozemond},
journal= {arXiv preprint arXiv:0711.4268},
year = {2011}
}
Comments
11 pages