250164 VO Group Theory (2005W)
Group Theory
Labels
erstmals am 4.10.2005. Alle InteressentInnen werden ersucht, beim ersten Termin am 4.10.05 anwesend zu sein, da mögliche Terminänderungen diskutiert werden sollen.
Details
Language: German
Lecturers
Classes (iCal) - next class is marked with N
- Tuesday 04.10. 13:15 - 14:45 Seminarraum
- Wednesday 05.10. 13:00 - 14:30 Seminarraum
- Tuesday 11.10. 13:15 - 14:45 Seminarraum
- Wednesday 12.10. 13:00 - 14:30 Seminarraum
- Tuesday 18.10. 13:15 - 14:45 Seminarraum
- Wednesday 19.10. 13:00 - 14:30 Seminarraum
- Tuesday 25.10. 13:15 - 14:45 Seminarraum
- Tuesday 08.11. 13:15 - 14:45 Seminarraum
- Wednesday 09.11. 13:00 - 14:30 Seminarraum
- Tuesday 15.11. 13:15 - 14:45 Seminarraum
- Wednesday 16.11. 13:00 - 14:30 Seminarraum
- Tuesday 22.11. 13:15 - 14:45 Seminarraum
- Wednesday 23.11. 13:00 - 14:30 Seminarraum
- Tuesday 29.11. 13:15 - 14:45 Seminarraum
- Wednesday 30.11. 13:00 - 14:30 Seminarraum
- Tuesday 06.12. 13:15 - 14:45 Seminarraum
- Wednesday 07.12. 13:00 - 14:30 Seminarraum
- Tuesday 13.12. 13:15 - 14:45 Seminarraum
- Wednesday 14.12. 13:00 - 14:30 Seminarraum
- Tuesday 10.01. 13:15 - 14:45 Seminarraum
- Wednesday 11.01. 13:00 - 14:30 Seminarraum
- Tuesday 17.01. 13:15 - 14:45 Seminarraum
- Wednesday 18.01. 13:00 - 14:30 Seminarraum
- Tuesday 24.01. 13:15 - 14:45 Seminarraum
- Wednesday 25.01. 13:00 - 14:30 Seminarraum
- Tuesday 31.01. 13:15 - 14:45 Seminarraum
Information
Aims, contents and method of the course
Assessment and permitted materials
Minimum requirements and assessment criteria
understanding of the subject
Examination topics
none
Reading list
(Auswahl) D. J. S. Robinson, A Course in the Theory of
Groups, Springer 1996; D. Gorenstein, Finite Groups, Harper & Row 1968;
J.-P.
Serre, Trees, Springer 1980.
Groups, Springer 1996; D. Gorenstein, Finite Groups, Harper & Row 1968;
J.-P.
Serre, Trees, Springer 1980.
Association in the course directory
Last modified: Mo 07.09.2020 15:40
permutation groups); series and decompositions; free groups, presentations,
combinatorial theory; p-groups, nilpotent and solvable groups; theory of
group
extensions (if time permits). Prerequisites: Linear Algebra 1,2, Algebra 1,
basic knowledge in topology and graph theory is helpful but NOT required.