Instructors: Prof. Dr. rer. nat. Robert Haller; M.Sc. Felix Christopher Helmut Ludwig Brandt; M.Sc. Tim Böhnlein
Event type:
Lecture & Exercise
Org-unit: Dept. 04 - Mathematics
Displayed in timetable as:
Ana II
Subject:
Crediting for:
Hours per week:
6
Language of instruction:
German
Min. | Max. participants:
- | -
Course Contents:
Convergence of sequences of functions, power series, topology of metric spaces, norms on R^n, differentiation of functions of several variables, partial derivatives, rules of differentation, gradient, higher derivatives and Taylor`s theorem in several variables, local extrema, inverse and implicit function theorems, integration: parameter integrals, curves in R^n and path integrals, Fourier series
Literature:
K. Königsberger: Analysis 1,2 , Springer
O. Forster: Analysis I & II. Vieweg
H. Heuser: Lehrbuch der Analysis 1, 2, Teubner.
W. Rudin: Principles of Mathematical
Analysis, McGraw-Hill
Preconditions:
Analysis 1
(participation without certification of prerequisites is possible)
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