Root Systems, Cartan Matrix and Dynkin Diagrams in Classification of Lie Algebras
Um Salama Ahmed Abdulla Alemam
Department of Mathematics, Faculty of Education, Alzaiem Alazhari University, Sudan.
Mohamed Alamin Abdalla Hamid Ahmed *
Department of Mathematics, Faculty of Education, Alzaiem Alazhari University, Sudan and Department of Mathematics, Faculty of Science and Arts - Khulais, University of Jeddah, Saudi Arabia.
*Author to whom correspondence should be addressed.
Abstract
This review paper deals with Lie algebras, with some concentration on root systems, which help in classification and many applications of symmetric spaces. We deal with the basic concept of a root system. First, its origins in the theory of Lie algebras are exposed, then an axiomatic definition is provided. Bases, Weyl groups, and the transitive action of the latter on the former are explained. Finally, the Cartan matrix and Dynkin diagram are exposed to suggest the multiple applications of root systems to other fields of study and their classification.
Keywords: Lie algebras, Root systems, Weyl group, Cartan Matrix and Dynkin diagrams.