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401-3225-00L 7 Credits BSC , MSC D-MATH
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Introduction to Lie Groups

Lecturers & Examiners: Prof. em. Dr. Alessandra Iozzi
VVZ CR n/a

Last Updated: 2026-06-01 11:33:47

Abstract

Topological groups and Haar measure. Definition of Lie groups, examples of local fields and examples of discrete subgroups; basic properties; Lie subgroups. Lie algebras and relation with Lie groups: exponential map, adjoint representation. Semisimplicity, nilpotency, solvability, compactness: Killing form, Lie's and Engel's theorems. Definition of algebraic groups and relation with Lie groups.

Objective

The goal is to have a broad though foundational knowledge of the theory of Lie groups and their associated Lie algebras with an emphasis on the algebraic and topological aspects of it.

Resources

Literature

A. Knapp: "Lie groups beyond an Introduction" (Birkhaeuser) A. Sagle & R. Walde: "Introduction to Lie groups and Lie algebras" (Academic Press, '73) F. Warner: "Foundations of differentiable manifolds and Lie groups" (Springer) H. Samelson: "Notes on Lie algebras" (Springer, '90) S. Helgason: "Differential geometry, Lie groups and symmetric spaces" (Academic Press, '78) A. Knapp: "Lie groups, Lie algebras and cohomology" (Princeton University Press)

Learning Materials (Links)

General Information

Language
English
Levels
BSC , MSC
Frequency
Yearly recurring

Examination

Type
session examination
Mode
oral 30 minutes
Bitte beachten Sie, dass die effektive Prüfungsdauer 25 Minuten beträgtPlease note that the effective duration of the oral exam is 25 minutes

Course Components

Type Title Time & Place Hours
lecture with exercise Introduction to Lie Groups
Planned to take place again already in the HS 2025, but not in the FS 2026.
  • Wed 12:15-14:00 (HG E 1.1)
  • Thu 12:15-14:00 (HG D 7.2)
  • 20.02 Date 12:15-14:00 (HG D 1.1)
4 h weekly

Offered In