Math 427: Complex Analysis
 

Instructor:	Ilie Ugarcovici
Time:	TR 1:00-2:20 pm
Location:	427 Herman Brown
Office:	452 Herman Brown Hall
Office Hours:	T, W, Th 2:30-3:30 (or by appointment)
Office Phone:	(713) 348-2385 (x2385 on campus)
E-mail:	idu@rice.edu
TA:	Yiyun (Tracy) Tang (yiyun@math.rice.edu) Yue Wu  (yuewu@math.rice.edu)

FINAL EXAM (due Thursday, 05/05 by 5:00 pm)

·        Course info
 

·        Homework and schedule
 

·        Analysis Qual problems and solutions (Rice U.)

·        Complex Analysis problems (Berkeley prelims ‘77-‘88)

Announcements:

• 01/20: For problems 10, 11 (Hw#1), assume temporarily that f is such that both u=Re(f), and w=Im(f)  are of class C^2 (as you will see later, this is always true for holomorphic functions); for Problem 13, the set Ω needs to be a region (open and connected set). Try to prove first that if f ’=0 then f is constant (without using path integrals)