Lie groups and Lie algebras 1000-135AGL

1. Examples of classical Lie groups. Quaternions and the symplectic group.
2. Abstract Lie groups. Left-invariant vector fields, the exponential map, the adjoint representation.
3. Tori and their representations. The maximal tori in a compact Lie group.
4. Lie algebras associated to Lie groups. Classical matrix examples.
5. Classical Lie's theory: correspondence between Lie groups and Lie algebras.
6. Abstract approach to Lie algebras. Ideals, quotient Lie algebras and the corresponding group constructions. Relations between properties of Lie groups and Lie algebras.
7. Solvable, nilpotent and semisimple Lie algebras. Killing's form. Cartan's criteria fo solvability and semisimplicity.
8. Properties of Lie algebras associated to compact Lie groups. Invariant bilinear forms. Complex reductive Lie groups (as complexifications of compact Lie groups).
9. Classification of simple Lie algebras by root systems.
10. Representations of compact Lie groups. Characters of representations.
11. Representations of classical Lie groups and Lie algebras. Highest weight representations.
12. Representations of GL (n;C). Young diagrams (information about Pieri formula and Weyl's character formula).
13. Homogeneous spaces of classical groups. Torus action on G/P, fixed points, cell decompostion (using examples of Grassmannian and the flag variety).

Main fields of studies for MISMaP

mathematics
physics

Type of course

elective courses

Course coordinators

Andrzej Weber

Learning outcomes

Student knows basic notions of Lie group and Lie algebras theory and related representation theory. In particular the student is fluent in the theory presented in the description of the lecture. This constitutes a star of further development and independent research.

Assessment criteria

The lecture ends with a written and an oral exam. 20 % of the final grade consists of homework and active participation in the exercise sessions.

Bibliography

1. Adams, J.F. Lectures on Lie groups. 1969
2. Brocker, Theodor; tom Dieck, Tammo. Representations of compact Lie groups. GTM 98, 1985
3. Erdmann K., Wildon M. J. Introduction to Lie Algebras. 2006
4. Fulton, William, Harris, Joe. Representation theory. A rst course. 1991
5. Jacobson, Nathan. Lie algebras. 1962 (1979).
6. Knapp, Anthony W. Representation theory of semisimple groups. An overview based on examplesconstitutes
1986 (2001).
7. Kirillov, Alexander, Jr. An introduction to Lie groups and Lie algebras. Cambridge Studies in Advanced Mathematics, 113. (2008)

Additional information

Information on level of this course, year of study and semester when the course unit is delivered, types and amount of class hours - can be found in course structure diagrams of apropriate study programmes. This course is related to the following study programmes:

Additional information (registration calendar, class conductors, localization and schedules of classes), might be available in the USOSweb system:

Description of 1000-135AGL in USOSweb