3H: Methods in Complex Analysis

University of Glasgow

Course Description

  • Course Name

    3H: Methods in Complex Analysis

  • Host University

    University of Glasgow

  • Location

    Glasgow, Scotland

  • Area of Study

    Mathematics

  • Language Level

    Taught In English

  • Course Level Recommendations

    Upper

    ISA offers course level recommendations in an effort to facilitate the determination of course levels by credential evaluators.We advice each institution to have their own credentials evaluator make the final decision regrading course levels.

    Hours & Credits

  • Scotcat Credits

    10
  • Recommended U.S. Semester Credits
    2.5 - 3
  • Recommended U.S. Quarter Units
    1
  • Overview

    Course Aims
    The aim of this course is to introduce the theory of analytic functions of one complex variable. The approach taken will be application driven, while setting the background for a rigorous treatment in a later course.

    Intended Learning Outcomes of Course
    By the end of this course students will be able to:
    - state the Cauchy-Riemann equations and derive these from the definition of differentability; use the Cauchy-Riemann equations to determine whether a complex function is analytic on a specified domain; determine whether a function is harmonic and calculate a harmonic conjugate; define and compute with elementary (polynomial, rational, exponential, trigonometric) complex functions; define and compute complex logarithms and powers;
    - compute integrals of continuous functions along curves in the complex plane; establish elementary properties of these integrals including the estimation lemma; use the estimation lemma to control integrals of a similar nature to those covered in lectures;
    - state Cauchy's theorem for a simple closed path and related results; state and discuss how to prove Taylor's theorem and Cauchy's integral formula for the n-th derivative;
    - determine the nature of singularities and compute the residues at poles of suitable meromorphic functions; state the residue theorem, discuss how it can be deduced and use the residue theorem to evaluate real integrals;
    - define the notion of a conformal map; give examples of conformal maps between elementary simple domains; establish properties of bilinear maps; compute the image of a line or circle under a bilinear transformation; state the Riemann mapping theorem.

Course Disclaimer

Courses and course hours of instruction are subject to change.

Credits earned vary according to the policies of the students' home institutions. According to ISA policy and possible visa requirements, students must maintain full-time enrollment status, as determined by their home institutions, for the duration of the program.

ECTS (European Credit Transfer and Accumulation System) credits are converted to semester credits/quarter units differently among U.S. universities. Students should confirm the conversion scale used at their home university when determining credit transfer.

Please note that some courses with locals have recommended prerequisite courses. It is the student's responsibility to consult any recommended prerequisites prior to enrolling in their course.