COURSE:   Complex Analysis, M381D, #57560, MWF 10-11am, Spring 2005
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TEXT:     L.V. Ahlfors, Complex Analysis, 3rd Edition, McGraw-Hill, 1979.
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SYLLABUS: Much of chapters 2-4 in Ahlfors' book, part of chapters 5 and 6,
--------  and some more on elliptic functions and/or Riemann surfaces.
          This includes the topics listed on the Preliminary Exam Syllabus.

INSTRUCTOR: H. Koch, Office Hours: MF 3:00-4:30, RLM 12.152, Tel: 471-8183,
----------  Email: koch@math.utexas.edu, Web: www.ma.utexas.edu/users/koch/

HOMEWORK: Homework will be assigned on Wednesdays, and collected one week
--------  later in class. The homework counts 10% toward the class grade.

EXAMS:    There will be two in-class midterm exam on Wednesday February 23
-----     and Wednesday April 6, and a final on Wednesday May 11, 2-4 pm.
          The highest midterm grade, and the grade on the final contribute
          45% each to the class grade.

SOME OTHER REFERENCES:

J.B. Conway, "Functions of One Complex Variable", Springer, 1978.
T.W. Gamelin, "Complex Analysis", Springer, 2001.
R.E. Greene, S.G. Krantz, "Function Theory of One Complex Variable", AMS, 2001.
S.G. Krantz, "Complex Analysis: The Geometric Viewpoint", MAA, 1990.
B.P. Palka, "An Introduction to Complex Function Theory", Springer, 1991.
W. Rudin, "Real and Complex Analysis", McGraw-Hill, 1987.