The primary aim of this note
is the introduction and discussion of the finite dimensional semisimple Lie
algebras over algebraically closed fields of characteristic and their
representations. Topics covered includes: Types of algebras, Jordan algebras,
Lie algebras and representation, Matrix algebras, Lie groups, Basic structure
theory and Basic representation theory, Nilpotent representations, Killing forms
and semisimple Lie algebras, Semisimple Lie algebras, Representations of
semisimple algebras
This note
explains the following topics: Representations of sl2, Structure and classification of
simple lie algebras, Structure theory of semisimple lie algebras and root
systems.
This note covers the
following topics: Solvable and nilpotent Lie algebras, The theorems of Engel and
Lie, representation theory, Cartan’s criteria, Weyl’s theorem, Root systems,
Cartan matrices and Dynkin diagrams, The classical Lie algebras, Representation
theory.
This note focus on
the so-called matrix Lie groups since this allows us to cover the most common
examples of Lie groups in the most direct manner and with the minimum amount of
background knowledge. Topics covered includes: Matrix Lie groups, Topology of
Lie groups, Maximal tori and centres, Lie algebras and the exponential map,
Covering groups.
The aim of this note
is to develop the basic general theory of Lie algebras to give a first insight
into the basics of the structure theory and representation theory of semi simple
Lie algebras. Topics covered includes: Group actions and group
representations, General theory of Lie algebras, Structure theory of complex
semisimple Lie algebras, Cartan subalgebras, Representation theory of complex
semisimple Lie algebras, Tools for dealing with finite dimensional
representations.
In these lectures we will
start from the beginning the theory of Lie algebras and their representations.
Topics covered includes: General properties of Lie algebras, Jordan-Chevalley
decomposition, semisimple Lie algebras, Classification of complex semisimple Lie
algebras, Cartan subalgebras, classification of connected Coxeter graphs and
complex semisimple Lie algebras, Poicare-Birkhoff-Witt theorem.
This book covers the following topics: Lie Groups:Basic
Definitions, Lie algebras, Representations of Lie Groups and Lie
Algebras, Structure Theory of Lie Algebras, Complex Semisimple Lie Algebras,
Root Systems, Representations of Semisimple Lie Algebras, Root Systems and
Simple Lie Algebras.