We will present the basic properties of complex analytic functions. We begin with the complex numbers themselves and elementary functions and their mapping properties, then discuss Cauchy's integral theorem and Cauchy's integral formula and applications. Then we discuss Taylor and Laurent series, zeros and poles and residue theorems, the argument principle, and Rouche's theorem.
||Gen Ed Area Dept:
|Course Format: Lecture||Grading Mode: Graded|
||Fulfills a Major Requirement for: (CIS)(COMP)(MATH)(NS&B)
||Past Enrollment Probability: Not Available
|Major Readings: Wesleyan RJ Julia Bookstore
To be announced.
|Examinations and Assignments: |
Weekly homework, midterm and final.
|Additional Requirements and/or Comments: |
Students should already have taken MATH222.
|Instructor(s): Bonfert-Taylor,Petra Times: ..T.R.. 09:00AM-10:20AM; Location: SCIE638; |
|Total Enrollment Limit: 25||SR major: 0||JR major: 0|| || |
|Seats Available: 15||GRAD: 0||SR non-major: 8||JR non-major: 8||SO: 7||FR: 2|
|Drop/Add Enrollment Requests|
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