Math 612 —
Spring 2001
Complex Analysis
| Instructor: |
Robert Strichartz |
| Time: |
TR 2:55-4:10 |
| Room: |
MT 203 |
Text: Conway, "Functions of one complex variable," plus
additional lecture notes
Prerequisite: Math 611
This is the required graduate course in complex analysis. We will cove
standard material in one complex variable theory, including the Riemann
mapping theorem, the two Picard theorems and an introduction to Riemann
surfaces. In addition, we will do the elements of distribution theory
and Fourier transforms, including the Paley-Wiener theorem on the analytic
continuation of Fourier transforms of functions of compact support. As
an application of complex analysis to PDEs, we will prove the Malgrange-Ehrenpreis
theorem on existence of solutions to constant coefficient linear equations.
Students will be expected to do most of the lecturing in the course and
will be required to complete a small project exploring some topic in greater
depth.
Last modified:
April 7, 2003
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