MATH732 RIEMANN SURFACES
Course Code: | 2360732 |
METU Credit (Theoretical-Laboratory hours/week): | 3 (3.00 - 0.00) |
ECTS Credit: | 8.0 |
Department: | Mathematics |
Language of Instruction: | English |
Level of Study: | Graduate |
Course Coordinator: | Prof.Dr. ALİ ULAŞ ÖZGÜR KİŞİSEL |
Offered Semester: | Fall Semesters. |
Course Objectives
This course aims to cover the theory of Riemann surfaces from different (algebraic, topological, analytical) perspectives.
Course Content
Courses not listed in catalogue. Contents vary from year to year according to interest of students and instructor in charge. Typical contents include contemporary developments in Algebra, Analysis, Geometry, Topology, Applied Mathematics.
Course Learning Outcomes
By the end of this course, a student will have mastered the essentials of Riemann surface theory.
Program Outcomes Matrix
Level of Contribution | |||||
# | Program Outcomes | 0 | 1 | 2 | 3 |
1 | Acquires mathematical thinking skills (problem solving, generating ways of thinking, forming correspondence, generalizing etc.) and can use them in related fields. | ✔ | |||
2 | Gains academic maturity through self-study. | ✔ | |||
3 | Can design mathematics related problems, devise solution methods and apply them when appropriate. | ✔ | |||
4 | Carries out parts of a mathematical research program independently. | ✔ | |||
5 | Has a command of Turkish and English languages so that he/she can actively communicate (read, write, listen and speak). | ✔ | |||
6 | Contributes to solving global, environmental and social problems either individually or as being part of a social group. | ✔ | |||
7 | Respects ethical values and rules; applies them in professional and social issues. | ✔ | |||
8 | Can work cooperatively in a team and also individually. | ✔ | |||
9 | Gets exposed to academic culture through interaction with others. | ✔ | |||
10 | Comprehends necessity of knowledge, can define it and acquires it; uses knowledge effectively and shares it with others. | ✔ |
0: No Contribution 1: Little Contribution 2: Partial Contribution 3: Full Contribution