Course syllabus
Course PM
This page contains the program of the course: lectures, exercise sessions and computer labs. Other information, such as learning outcomes, teachers, literature and examination, are in a separate course PM.
We will use these lecture notes. Priestley's book is recommended as extra reading; we will also use it as a source of exercises.
Program
The schedule of the course is in TimeEdit.
Lectures
Will be given live over Zoom; links will be posted here.
(LN=lecture notes, P=Priestley's book)
| Day | Chapter | Content |
|---|---|---|
| Mon, Nov 2 10.00-11.45 |
LN: App. A, Ch. 1 P: 1, 2 |
Intro and repetition; complex arithmetics, polynomials, de Moivre, |
| Tue, Nov 3 10.00-11.45 |
LN: 1 P: 2 |
Möbius transformations, circlines, the Riemann sphere |
| Thu, Nov 5 10.00-11.45 |
LN: App. B, Ch. 2 P: 3, 10 |
Open and closed sets in the plane and on the Riemann sphere, continuity and limits, two-variable calculus in complex notation |
| Mon, Nov 9 10.00-11.45 |
LN: 2, 3 P: 5 |
Green's formula, the Cauchy-Riemann equations, elementary properties of holomorphic functions |
| Tue, Nov 10 10.00-11.45 |
LN: 3 P: 5, 13 |
Cauchy's theorem and formula |
| Thu, Nov 12 10.00-11.45 |
LN: 3 P: 5, 13 |
Cont. of the above |
| Mon, Nov 16 10.00-11.45 |
LN: 4 P: 6 |
complex series, convergences tests, functions defined by series, power series |
| Tue, Nov 17 10.00-11.45 |
LN: 4 P: 6, 14 |
power series, Taylor's formula, representation of holomorphic functions |
| Thu, Nov 19 10.00-11.45 |
LN: 5 P: 7 |
holomorphic functions defined by power series, exp, trig, log, etc. |
| Mon, Nov 23 10.00-11.45 |
LN: 5 P: 7 |
Cont. of the above |
| Tue, Nov 24 10.00-11.45 |
LN: 6 P: 13 |
Liouville's theorem, the fundamental theorem of algebra |
| Thu, Nov 26 10.00-11.45 |
LN: 7 P: 8 |
conformal mappings, Möbius transformations again |
| Mon, Nov 30 10.00-11.45 |
LN:8 P: 13 |
Morera's and Goursat's theorems |
| Tue, Dec 1 10.00-11.45 |
LN: 9 P: 15 |
zeroes and their orders, identity theorem, analytic continuation |
| Thu, Dec 3 10.00-11.45 |
LN: 9 P:15 |
counting zeroes, Rouche's theorem |
| Mon, Dec 7 10.00-11.45 |
LN: 10 P:12 |
homotopy, homology, Cauchy's theorem again, winding numbers, simply connected domains |
| Tue, Dec 8 10.00-11.45 |
LN: 10, 11 P: 12, 16 |
Cont. of the above, Maximum principle |
|
Wed, Dec 9 10.00-11.45 |
LN: 11 P: 16 |
Schwarz' lemma, mapping theorems |
| Mon, Dec 14 10.00-11.45 |
LN: 11 P: 16 |
Cont. of the above |
| Tue, Dec 15 10.00-11.45 |
LN:12 P: 17 |
singularities, Laurent series and expansions |
| Thu, Dec 17 10.00-11.45 |
LN:12, 13 P: 18, 19 |
residues and the Residue theorem, real integral with complex analytic methods |
| Mon, Jan 4 10.00-11.45 |
LN:13 P: 19, 20 |
Cont. of the above |
| Tue, Jan 5 10.00-11.45 |
LN:14 P: 23 |
something about harmonic functions, the Dirichlet problem, and physical applications |
| Thu, Jan 7 10.00-11.45 |
|
Old exams |
|
Tue, Jan 12 8.30-12.30 |
Exam | |
| Day | Sections | Content |
|---|---|---|
Recommended exercises
| Week | Exercises |
|---|---|
| 45 |
P: 1.1, 1.2, 1.4, 1.7, 1.9, 1.10; 3.1; 2.1, 2.3, 2.11, 2.15i LN: A.1, A.2, A.4, A.5; B.1, B.2; 1.9, 1.10, 1.11, 1.8 |
| 46 |
P: 5.4, 5.5a, 5.6, 5.10; LN: 2.2, 2.6, 2.9, 2.10, 2.11, 2.12; 3.5, 3.11, 3.12, 3.13, 3.14, 3.15; |
| 47 |
P: 6.2, 6.4, 6.7; 7.1, 7.2, 7.10b, 7.11i, iii, 7.12, 7.13, 7.15 LN: 4.2, 4.3, 4.4, 4.6; 5.3, 5.7, 5.8, 5.9, 5.10, 5.11, 5.12,
|
| 48 |
P: 11.1, 11.3; LN: 5.13, 5.14, 5.15; 6.2, 6.4, 6.5, 6.6; 7.2, 7.6, 7.7, 7.8, 7.9, 7.10; |
| 49 |
P: 15.1, 15.3, 15.6, 15.7, 15.10, LN: 8.2, 8.3; 9.1, 9.2, 9.3, 9.4, |
| 50 |
P: 15.11, 15.12, 15.13; 16.2, 16.6, 16.7 LN: 9.5, 9.6, 9.7; 11.1, 11.2, 11.3; |
| 51 |
P: 17.1, 17.5, 17.9, 17.15, 17.18; 18.2, 18.3, 18.4, 18.6, 18.9; LN: 12.4, 12.5, 12.6, 12.7, 12.8, 12.9, 12.10, 12.11; 13.1, 13.2, 13.3, 13.4, 13.5, 13.6, 13.7, |
| 1, 2021 |
P: 20.1, 20.2, 20.4, 20.8, 20.9, 20.13, 20.16, 20.20 LN: 13.9, 13.10, 13.11; 14.2, 14.3, 14.6, 14.7 |
| Day | Exercises |
|---|---|
Computer labs
Here are some simple MATLAB exercises that help illustrate the theory. They are not part of the examination and shouldn't be reported.
LAB1 a mapping game
LAB2 the Argument principle
LAB3 a potential problem
Reference literature:
- Learning MATLAB, Tobin A. Driscoll. Provides a brief introduction to Matlab to the one who already knows computer programming. Available as e-book from Chalmers library.
-
Physical Modeling in MATLAB 3/E, Allen B. Downey
The book is free to download from the web. The book gives an introduction for those who have not programmed before. It covers basic MATLAB programming with a focus on modeling and simulation of physical systems.
Course summary:
| Date | Details | Due |
|---|---|---|