Education Information System

Course Title	Code	Semester	L+U Hour	Credits	ECTS
Functions of Complex Variables II	MAT531		3 + 0	3.0	8.0

Prerequisites

None

Language of Instruction	Turkish
Course Level	Graduate
Course Type
Mode of delivery	Lecturing
Course Coordinator	Assoc. Prof. Dr. İzzettin DEMİR
Instructors	İzzettin DEMİR
Assistants
Goals	Teaching high level of mathematics to graduate degree students.
Course Content	Runge theorem,Analytical continuation and Riemannian surfaces,Harmonic functions,Complete functions
Learning Outcomes

Week	Topics	Learning Methods
1. Week	Runge theorem
2. Week	Runge theorem
3. Week	Analytical continuation and Riemannian surfaces
4. Week	Analytical continuation and Riemannian surfaces
5. Week	Analytical continuation and Riemannian surfaces
6. Week	Analytical continuation and Riemannian surfaces
7. Week	Analytical continuation and Riemannian surfaces
8. Week	Midterm
9. Week	Harmonic functions
10. Week	Harmonic functions
11. Week	Harmonic functions
12. Week	Complete functions
13. Week	Complete functions
14. Week	Complete functions

Lars V. Ahlfors, complex Analysis, McGraw-Hill Kogakusha, Ltd., London

Conway, J. B, Functıons Of One Complex Variable, Springer-Verlag, New York, 1978.

Program Requirements	Contribution Level	Measurement Method
PY1	4	60
PY2	4	60
PY3	4	60
PY4	3	60
PY5	3	60
PY6	2	60
PY7	3	60
PY8	5	60
PY9	3	60
PY10	4	60

*DK = Course's Contrubution.

	0	1	2	3	4	5
Course's Level of contribution	None	Very Low	Low	Fair	High	Very High
Method of assessment/evaluation		Written exam	Oral Exams	Assignment/Project	Laboratory work	Presentation/Seminar

Event	Quantity	Duration (Hour)	Total Workload (Hour)
Course Hours	14	3	42
Research	14	3	42
Other Activities	14	1	14
Midterm 1	1	2	2
Homework 1	14	3	42
Homework 2	14	2	28
Final	1	2	2
Practice	6	2	12
Classroom Activities	14	1	14
Total Workload			198
ECTS Credit of the Course			25.5 8.0