Title of article
Derivations and automorphisms of Jordan algebras in characteristic two
Author/Authors
Pablo Alberca Bjerregaard، نويسنده , , Ottmar Loos، نويسنده , , C?ndido Mart?n Gonz?lez، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2005
Pages
36
From page
146
To page
181
Abstract
A Jordan algebra J over a field k of characteristic 2 becomes a 2-Lie algebra L(J) with Lie product [x,y]=x○y and squaring x[2]=x2. We determine the precise ideal structure of L(J) in case J is simple finite-dimensional and k is algebraically closed. We also decide which of these algebras have smooth automorphism groups. Finally, we study the derivation algebra of a reduced Albert algebra and show that DerJ has a unique proper nonzero ideal VJ, isomorphic to L(J)/k 1J, with quotient DerJ/VJ independent of . On the group level, this gives rise to a special isogeny between the automorphism group of J and that of the split Albert algebra, whose kernel is the infinitesimal group determined by VJ.
Journal title
Journal of Algebra
Serial Year
2005
Journal title
Journal of Algebra
Record number
697057
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