Math 324: Complex Analysis

Spring 2008
Instructor: Thierry Zell


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Syllabus

[PDF]

Homework

Hw 1

p. 11 #4,5; p. 13 #2,6; p. 21 #2; p. 29 #6.

Hw 2

  1. Prove that if S is open, every point in S is an interior point.
  2. Prove that the complement of an open set is closed, and vice-versa.
  3. Give an example of a set which has only boundary points.
  4. Give an example of a disconnected set whose closure is connected.
  5. Prove that S is closed if and only if S contains all of its accumulation points.
  6. Prove that a finite set has no accumulation point.

Hw 3

p. 42 # 1,3,4,6,7,8.

Hw 4

p. 60 #8,9 and p. 69 #1,4,6.

HW 5

p.73 # 1,2,3,7. p. 78 # 2,4,5.

HW 6

p. 78 # 7,8,9. p. 85 #1, 4.

HW 7

p. 115 # 3,4,5. p. 121 #5.

HW 8

p. 129 #7,10. p. 133 # 1,2. p. 141 #1,3.

Hw 9

p. 153 1abc,2,6.

Hw 10

p. 163 1abc,2,5,7.

HW 11

p.171 #1,2,4,5.