MATH 302 Fall 2012 Complex Analysis (Q)

The calculus of complex-valued functions turns out to have unexpected simplicity and power. As an example of simplicity, every complex-differentiable function is automatically infinitely differentiable. As examples of power, the so-called "residue calculus" permits the computation of "impossible" integrals, and "conformal mapping" reduces physical problems on very general domains to problems on the round disc. The easiest proof of the Fundamental Theorem of Algebra, not to mention the first proof of the Prime Number Theorem, used complex analysis.
Class Format: tutorial
Requirements/Evaluation: evaluation will be based primarily on homework, classwork, and exams
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Prerequisites: Mathematics 301 or 305
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Divisional Attributes: Division III,Quantitative and Formal Reasoning
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Enrollment Limit: 10
Expected Enrollment: 10
Class Number: 1235
CLASSES ATTR INSTRUCTORS TIMES CLASS NUMBER
MATH302-T1(F) TUT Complex Analysis (Q) Division 3: Science and MathematicsQuantitative and Formal Reasoning Andrey Glubokov
TBA 1235
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