19219917
Seminar/Proseminar
SoSe 16: Proseminar/Seminar Riemann surfaces
Valentina Di Proietto
Kommentar
The theory of Riemann surfaces is a huge and important subject. Riemann surfaces are studied using topological, algebraic and analytic techniques and they are a source of inspiration for sophisticated and contemporary open problems in algebraic geometry, number theory and differential geometry.
In this seminar we focus on the basics of the theory of Riemann surfaces, stressing the topological and algebraic aspects of the theory. We develop the topological theory of coverings and fundamental group and we apply this to the study of Riemann surfaces. One of the beautiful results that we will reach is the main statement and proof of Galois theory for Riemann surfaces.
The prerequisites that you need are basic algebra, basic topology, calculus and basic complex analysis. You can find the detailed program here: Seminar on Rieman surfaces Schließen
In this seminar we focus on the basics of the theory of Riemann surfaces, stressing the topological and algebraic aspects of the theory. We develop the topological theory of coverings and fundamental group and we apply this to the study of Riemann surfaces. One of the beautiful results that we will reach is the main statement and proof of Galois theory for Riemann surfaces.
The prerequisites that you need are basic algebra, basic topology, calculus and basic complex analysis. You can find the detailed program here: Seminar on Rieman surfaces Schließen
13 Termine
Regelmäßige Termine der Lehrveranstaltung
Do, 21.04.2016 16:00 - 18:00
Do, 28.04.2016 16:00 - 18:00
Do, 12.05.2016 16:00 - 18:00
Do, 19.05.2016 16:00 - 18:00
Do, 26.05.2016 16:00 - 18:00
Do, 02.06.2016 16:00 - 18:00
Do, 09.06.2016 16:00 - 18:00
Do, 16.06.2016 16:00 - 18:00
Do, 23.06.2016 16:00 - 18:00
Do, 30.06.2016 16:00 - 18:00
Do, 07.07.2016 16:00 - 18:00
Do, 14.07.2016 16:00 - 18:00
Do, 21.07.2016 16:00 - 18:00