MATH 302 - Complex Analysis II
Fall 2011
Ali
Sinan Sertöz
Faculty of Science, Department of Mathematics, Room: SA-121
Office Hours: Wednesday
10:30-12:00, SA-121
Text Books:
Bak & Newman, Complex
Analysis, Third Edition, Springer, 2010.
(any other edition should do equally well.)
Recommended Text Books:
| MON | 10:40-12:30 | SAZ-01 |
| THU | 09:40-10:30 | SAZ-01 |
Attendance:
| Attendance is a must. I will take attendance in class and take it seriously. See the grading policy below. |
Exams and Grading:
| Midterm 1 | 25% | 3 November 2011 |
at 8:40 at SAZ-01 |
Solution |
| Midterm 2 |
25% | 8 December 2011 | at 8:40 at SAZ-01 | Solution |
| Final | 25% | 10 January 2012 | at 9:00 at SAZ-18 | Solution |
| Make-up | 20 January 2012 | at 9:00 at SAZ-01 and SAZ-18 | Solution | |
| Homework | 20% | |||
| Attendance |
5% |
The course will be graded according to the following `semi-catalogue' :
| [0,40) | F |
| [40,45) | D |
| [45,50) | D+ |
| [50,55) | C- |
Any
total score of 55 or above will receive a passing letter grade according to the
distribution of those scores among themselves.
Homework:
| Homework | Due date | Solution |
| Homework-1 | 24 Oct 2011 | Solution |
| Homework-2 | 31 Oct 2011 | Solution |
| Homework-3 | 31 Oct 2011 | Solution |
| Homework-4 | 26 Dec 2011 | Solution |
Syllabus:
| Week |
Date |
Subjects to be covered |
Chapter |
| 1 | 26-29 Sep | Review of fundamental results | |
| 2 |
3-6 Oct |
Infinite sums via residues | 11 |
| 3 | 10-13 Oct | Further residue techniques | 12 |
| 4 | 17-20 Oct | Conformal Mappings | 13 |
| 5 | 24-27 Oct | Riemann mapping theorem | 14 |
| 6 | 31 Oct | Maximum modulus principle | 15 |
| 6 | 3 Nov-Thursday | Midterm 1, at 8:40 at SAZ-01 | |
| 7-10 Nov |
Holiday |
||
| 7 | 14-17 Nov | Harmonic functions | 16 |
| 8 | 21-24 Nov | Harmonic functions | 16 |
| 9 | 28 Nov-1 Dec | Infinite products | 17 |
| 10 | 5 Dec | Infinite products | 17 |
| 10 | 8 Dec-Thursday | Midterm 2, at 8:40 at SAZ-01 | |
| 11 | 12-15 Dec | Gamma function | 18 |
| 12 | 19-22 Dec | Zeta function | 18 |
| 13 | 26-29 Dec | Prime number theorem | 19 |
| 14 | 2-5 Jan | Prime number theorem | 19 |
Old Exams:
You can refer to my all courses page.
Contact address is:
