REPRESENTATIONS OF RANK 3 ALGEBRAS

Author	dc.contributor.author	Benkart, Georgia
Author	dc.contributor.author	Labra Jeldres, Alicia	es_CL
Admission date	dc.date.accessioned	2008-12-10T16:56:44Z
Available date	dc.date.available	2008-12-10T16:56:44Z
Publication date	dc.date.issued	2006
Cita de ítem	dc.identifier.citation	COMMUNICATIONS IN ALGEBRA Volume: 34 Issue: 8 Pages: 2867-2877 Published: 2006	en
Identifier	dc.identifier.issn	0092-7872
Identifier	dc.identifier.uri	https://repositorio.uchile.cl/handle/2250/118756
Abstract	dc.description.abstract	The class of rank 3 algebras includes the Jordan algebra of a symmetric bilinear form, the trace zero elements of a Jordan algebra of degree 3, pseudo-composition algebras, certain algebras that arise in the study of Riccati differential equations, as well as many other algebras. We investigate the representations of rank 3 algebras and show under some conditions on the eigenspaces of the left multiplication operator determined by an idempotent element that the finite-dimensional irreducible representations are all one-dimensional.	en
Lenguage	dc.language.iso	en	en
Publisher	dc.publisher	TAYLOR & FRANCIS INC	en
Keywords	dc.subject	ROOT SYSTEMS	en
Título	dc.title	REPRESENTATIONS OF RANK 3 ALGEBRAS	en
Document type	dc.type	Artículo de revista