Last
modified on 8/11/08.
Notes starting with Ch.11, hopefully stable, v. 8/11.
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Notes Chs.5--10 , hopefully stable, v. 7/24
Power series done right (optional)
HW#3 Solution
to B
Notes through Ch.5 , hopefully stable,
version 7/12/08.
HW#1
solutions
Instructions for documenting your work
Homework archive
Math 660, Introductory Complex Analysis
Su08, MTWRF 0830-0918, AV214, Call No. 12142-9
Basic description: A first course in theoretical complex analysis (the
"local" theory) designed for doctoral students in the Department of
Mathematics. Rigorous proofs are emphasized over applications. This
course (or equivalent) is one of the prerequisites for 700-level
complex analysis (Math 753, to be offered in Au08). If you are
interested more in applications than theory, then you should
consider Math 654.
Prereqisite: Math 548 (or equivalent) or math grad
status. Not open to students with credit for 654.
Formal requirements: There will be some turn-in homework (to be
described later), a midterm,
and a final. The date of the midterm will be determined later. The
final takes place on the
date and time prescribed by the University. If you already know
that you have a scheduling conflict, please alert me as soon as
possible.
Text:
Complex Analysis and Applications, R. Silverman, Dover, ISBN
0-486-64762-5. Some known errors
(courtesy of Prof. Edgar.) Though published by Dover, the book is
not currently available from them. It can be obtained (quite
inexpensively) through a number of other sources on the web. (Google
the complete name of the book together with "Silverman".) Be careful
not to buy Silverman's "Introductory Complex Analysis" by mistake. The
Schaum's Outline for complex analysis is quite useful as a study aid.
Coverage: At least the first thirteen chapters, but not the last
chapter.
Professor: C.
Miller
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