20221_math_520

Complex analysis, taught by Prof. Igor Kukavica.

• Course syllabus
• Former course website (ded link, RIP).
• Lecture notes — tbh I lost count of section numbers towards the end, so maybe I \chapter{}‘d at the wrong place.
• Homeworks. Disclaimer: a nontrivial portion of my solutions are flawed. Browse at your own risk. :)) 1 (Cauchy-Riemann) ‖ 2 (rational functions) ‖ 3 (fractional linear transformations) ‖ 4 (complex integration) ‖ there was no HW5 ‖ 6 (Cauchy integral formula) ‖ 7 (singularities) ‖ 8 (Schwarz lemma) ‖ 9 (simply connected regions) ‖ 10 (Rouché’s theorem & residue theroem) ‖ 11 (Laurent series & infinite products)