250098 VO Arithmetic algebraic geometry (2010W)
Labels
Details
Language: German
Examination dates
Lecturers
Classes (iCal) - next class is marked with N
- Thursday 14.10. 09:00 - 11:00 Seminarraum
- Friday 15.10. 09:00 - 11:00 Seminarraum
- Thursday 21.10. 09:00 - 11:00 Seminarraum
- Friday 22.10. 09:00 - 11:00 Seminarraum
- Thursday 28.10. 09:00 - 11:00 Seminarraum
- Friday 29.10. 09:00 - 11:00 Seminarraum
- Thursday 04.11. 09:00 - 11:00 Seminarraum
- Friday 05.11. 09:00 - 11:00 Seminarraum
- Thursday 11.11. 09:00 - 11:00 Seminarraum
- Friday 12.11. 09:00 - 11:00 Seminarraum
- Thursday 18.11. 09:00 - 11:00 Seminarraum
- Friday 19.11. 09:00 - 11:00 Seminarraum
- Thursday 25.11. 09:00 - 11:00 Seminarraum
- Friday 26.11. 09:00 - 11:00 Seminarraum
- Thursday 02.12. 09:00 - 11:00 Seminarraum
- Friday 03.12. 09:00 - 11:00 Seminarraum
- Thursday 09.12. 09:00 - 11:00 Seminarraum
- Friday 10.12. 09:00 - 11:00 Seminarraum
- Thursday 16.12. 09:00 - 11:00 Seminarraum
- Friday 17.12. 09:00 - 11:00 Seminarraum
- Thursday 13.01. 09:00 - 11:00 Seminarraum
- Friday 14.01. 09:00 - 11:00 Seminarraum
- Thursday 20.01. 09:00 - 11:00 Seminarraum
- Friday 21.01. 09:00 - 11:00 Seminarraum
- Thursday 27.01. 09:00 - 11:00 Seminarraum
- Friday 28.01. 09:00 - 11:00 Seminarraum
Information
Aims, contents and method of the course
Assessment and permitted materials
Bearbeitung von Übungsaufgaben, Kolloquium
Minimum requirements and assessment criteria
Examination topics
Reading list
Association in the course directory
MALV, MGEV
Last modified: Mo 07.09.2020 15:40
(1) theory of Chevalley groups, that is, the construction of the group
scheme over the integers for the adjoint group of a given type g ( g a
complex semi simple Liealgebra)
(2) various applications of this approach which connects Lie theory and
the arithmetic theory of algebraic groups
(3) groups schemes over Dedekind domainsPrerequisites: background material in the theory of complex semi simple
Lie algebras resp. (for part (2)) in algebraic geometry