Complex Analysis 2
Course content
- Normal families, conformal mapping and Riemann's mapping theorem
- Infinite products, Weierstrass factorization and applications to Euler's gamma function
- Iteration of holomorphic functions
- Harmonic and subharmonic functions
- Growth of entire functions
MSc Programme in Mathematics
MSc Programme in Mathematics with a minor subject
Knowledge: After completing the course the student is expected to have a thorough knowledge of definitions, theorems and examples related to the topics mentioned in the description of the course content and to have a deeper knowledge of complex analysis, both from an analytic and a geometric/topological point of view.
Skills: At the end of the course the student is expected to have the ability to use the acquired knowledge to follow arguments and proofs of advanced level as well as to solve relevant problems using complex methods.
Competences: At the end of the course the
student is expected to be able to:
1. Reproduce key results presented in the course together with
detailed proofs thereof,
2. Construct proofs of results in complex analysis at the
level of this course,
3. Use the course content to study relevant examples and to solve
concrete problems.
Five hours of lectures and two hours of exercise sessions per week for 7 weeks.
Introductory complex analysis (e.g. the course KomAn). We shall
occationally use results from introductory measure theory, such as
Lebesgue's dominated convergence theorem.
Academic qualifications equivalent to a BSc degree is
recommended.
- ECTS
- 7,5 ECTS
- Type of assessment
-
Oral examination, 30 minutes
- Type of assessment details
- There will be 30 minutes of preparation time before the oral examination.
- Examination prerequisites
-
To be allowed to take the oral exam the student must have at least 2 out of 3 homework assignments approved.
Generative Artificial Intelligence/ Large Language Models is NOT allowed during the homework assignments.
- Aid
- Only certain aids allowed (see description below)
All aids allowed during the preparation time. No aids allowed during the examination.
- Marking scale
- 7-point grading scale
- Censorship form
- No external censorship
Several internal examiners.
- Re-exam
-
Oral examination, 30 minutes with 30 minutes preparation time. All aids allowed during the preparation time. No aids allowed during the exam.
To be allowed to take the re-exam, students who have not already had 2 out of the 3 mandatory assignments approved must (re)submit all 3 assignments no later than three weeks before the beginning of the re-exam week and two of these assignments must be approved no later than two weeks before the beginning of the re-exam week.
Criteria for exam assessment
The student should convincingly and accurately demonstrate the knowledge, skills and competences described under Intended learning outcome.
Single subject courses (day)
- Category
- Hours
- Lectures
- 35
- Preparation
- 117
- Exercises
- 14
- Exam Preparation
- 39
- Exam
- 1
- English
- 206
Kursusinformation
- Language
- English
- Course number
- NMAK17002U
- ECTS
- 7,5 ECTS
- Programme level
- Full Degree Master
- Duration
-
1 block
- Placement
- Block 2
- Schedulegroup
-
C
- Capacity
- no limit
- Studyboard
- Study Board of Mathematics and Computer Science
Contracting department
- Department of Mathematical Sciences
Contracting faculty
- Faculty of Science
Course Coordinator
- Henrik Laurberg Pedersen (7-6a6770746b6d72426f63766a306d7730666d)
Er du BA- eller KA-studerende?
Kursusinformation for indskrevne studerende