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250112 VO Selected topics in complex analysis (2013S)
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Language: German
Examination dates
Lecturers
Classes (iCal) - next class is marked with N
- Monday 04.03. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 18.03. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 08.04. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 15.04. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 22.04. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 29.04. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 06.05. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 13.05. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 27.05. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 03.06. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 10.06. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 17.06. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
- Monday 24.06. 11:00 - 13:00 Seminarraum S1 Vienna Micro-CT Lab, Althanstraße 12-14
Information
Aims, contents and method of the course
Assessment and permitted materials
Minimum requirements and assessment criteria
Examination topics
Reading list
Steven Krantz :"Function theory of several complex
variables," Wadsworth & Brooks/Cole, 1992Klaus Fritzsche and Hans Grauert: "From holomorphic functions to complex manifolds", Graduate Texts in Mathematics, Springer-Verlag, 2002.
variables," Wadsworth & Brooks/Cole, 1992Klaus Fritzsche and Hans Grauert: "From holomorphic functions to complex manifolds", Graduate Texts in Mathematics, Springer-Verlag, 2002.
Association in the course directory
MANV
Last modified: Fr 01.10.2021 00:23
his book: "One might be tempted to think of the analysis of several complex variables as being esentially one variable theory with additional complication of multi-indices. This perception turns out to be incorrect. Deep new phenomena and profound problems present themselves in the theory of several variables." We start with a comparison of the theory in one complex variable and in several variables. The essential differences are used as a motivation and guideline for the lecture course. Holomorphic functions, power series, Cauchy-Riemann differential equations, domains of holomorphy, pseudoconvex domains, Hörmander's L^2
estimates for the solution of the inhomogeneous Cauchy-Riemann differential equations.