Lehrinhalte
Conformal mappings, Möbius transformation, Riemann's mapping Theorem; partial fractions, infinite products, Gamma function, elliptic functions and curves; entire functions; range of analytic functions; Little and Great Picard theorems
Literatur
J.B. Conway: Complex Analysis I, II, Springer.
L.V. Ahlfors: Complex Analysis, McGraw-Hill
Chr. Pommerenke: Boundary Behaviour of Conformal Maps, Springer
E. Freitag, R. Busam: Funktionentheorie 1, Springer
Voraussetzungen
recommended: Complex Analysis
Conformal mappings, Möbius transformation, Riemann's mapping Theorem; partial fractions, infinite products, Gamma function, elliptic functions and curves; entire functions; range of analytic functions; Little and Great Picard theorems
Literatur
J.B. Conway: Complex Analysis I, II, Springer.
L.V. Ahlfors: Complex Analysis, McGraw-Hill
Chr. Pommerenke: Boundary Behaviour of Conformal Maps, Springer
E. Freitag, R. Busam: Funktionentheorie 1, Springer
Voraussetzungen
recommended: Complex Analysis
- Lehrende: Reinhard Farwig
Semester: ST 2020