Advanced

Compact exceptional simple Kantor triple systems defined on tensor products of composition algebras

Mondoc, Daniel LU (2007) In Communications in Algebra 35(11). p.3699-3712
Abstract
In this article we give the classification of compact exceptional simple Kantor triple systems defined on tensor products of composition algebras

$A=\mathbb{A}_1\otimes\mathbb{A}_2$ such that

their Kantor algebras ${\cal L}(\phi,A)$ are real forms of exceptional simple Lie algebras.
Please use this url to cite or link to this publication:
author
publishing date
type
Contribution to journal
publication status
published
subject
keywords
structurable algebras, composition algebras, Kantor triple systems
in
Communications in Algebra
volume
35
issue
11
pages
3699 - 3712
publisher
Taylor & Francis
external identifiers
  • scopus:35448982632
ISSN
0092-7872
DOI
10.1080/00927870701404739
language
English
LU publication?
no
id
acaad611-e4b6-4ff4-afc5-46ba882552c5 (old id 1670170)
date added to LUP
2010-09-15 19:04:59
date last changed
2017-02-19 03:26:36
@article{acaad611-e4b6-4ff4-afc5-46ba882552c5,
  abstract     = {In this article we give the classification of compact exceptional simple Kantor triple systems defined on tensor products of composition algebras <br/><br>
$A=\mathbb{A}_1\otimes\mathbb{A}_2$ such that<br/><br>
their Kantor algebras ${\cal L}(\phi,A)$ are real forms of exceptional simple Lie algebras.},
  author       = {Mondoc, Daniel},
  issn         = {0092-7872},
  keyword      = {structurable algebras,composition algebras,Kantor triple systems},
  language     = {eng},
  number       = {11},
  pages        = {3699--3712},
  publisher    = {Taylor & Francis},
  series       = {Communications in Algebra},
  title        = {Compact exceptional simple Kantor triple systems defined on tensor products of composition algebras},
  url          = {http://dx.doi.org/10.1080/00927870701404739},
  volume       = {35},
  year         = {2007},
}