Introduction to Complex Analysis
Introduction to Complex Analysis
Complex algebra, analytic functions, integration in the complex plane, infinite series, theory of residues, conformal mapping.
Hours | 3.0 Credit, 3.0 Lecture, 0.0 Lab |
Prerequisites | MATH 290; Math 341 or concurrent enrollment. |
Taught | Fall, Winter, Summer |
Programs | Containing MATH 352 |
Course Outcomes:
Complex algebra, analytic functions, infinite series, etc.
This course is aimed at graduates majoring in mathematical and physical sciences and engineering. In addition to being an important branch of mathematics in its own right, complex analysis is an important tool for differential equations (ordinary and partial), algebraic geometry and number theory. Thus it is a core requirement for all mathematics majors. It contributes to all the expected learning outcomes of the Mathematics BS degree.For more detailed information visit the Math 352 Wiki page.
Mastery of Concepts
Students will master complex numbers, limits, analytic functions, elementary functions in the complex plane, contour integrals, Taylor series, Laurent series, isolated singularities, residue theory and applications, and conformal mappings.