104.378 AKANA Compact Lie Groups and Representation Theory

2024S, VO, 3.0h, 4.5EC

Properties

  • Semester hours: 3.0
  • Credits: 4.5
  • Type: VO Lecture
  • Format: Presence

Learning outcomes

After successful completion of the course, students are able to define the exponential map of Lie groups and their representations as well as formulate their basic properties and prove them. Moreover, students are able to define characters of compact Lie groups and formulate and prove the theorems of Frobenious and of Peter and Weyl.

Subject of course

Exponential map, Theorem of Frobenious, representations, characters, Theorem of Peter and Weyl

Teaching methods

Defintions and proofs

Mode of examination

Oral

Additional information

Lectures will take place on Monday from 16:00-18:00 and Wednesday from 11:00-12:00. The first lecture will be on Monday the 18th of March.

The first lecture will be posponed. It will now take place on  Monday the 8th of April (the fisrt Monday after easter break). 

 Now you can find the lecture rooms below.

 

Lecturers

Institute

Course dates

DayTimeDateLocationDescription
Mon16:00 - 18:0008.04.2024 - 24.06.2024Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed11:00 - 12:0010.04.2024 - 26.06.2024Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
AKANA Compact Lie Groups and Representation Theory - Single appointments
DayDateTimeLocationDescription
Mon08.04.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed10.04.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon15.04.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed17.04.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon22.04.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed24.04.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon29.04.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Mon06.05.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed08.05.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon13.05.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed15.05.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Wed22.05.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon27.05.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed29.05.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon03.06.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed05.06.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon10.06.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed12.06.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory
Mon17.06.202416:00 - 18:00Sem.R. DA grün 06A Compact Lie Groups and Representation Theory
Wed19.06.202411:00 - 12:00Sem.R. DB gelb 07 Compact Lie Groups and Representation Theory

Examination modalities

Oral

Course registration

Not necessary

Curricula

Study CodeObligationSemesterPrecon.Info
No records found.

Literature

Ein Skriptum zur Lehrveranstaltung ist erhältlich.

Previous knowledge

Course on analysis of manifolds

Language

German