MAT-60106 Complex Analysis, 5 cr

Additional information

The course homepage is:

https://moodle2.tut.fi/

Person responsible

Petteri Laakkonen

Lessons

Implementation Period Person responsible Requirements
MAT-60106 2018-01 2 Petteri Laakkonen
Final examination.

Learning Outcomes

After passing the course the student: - recognizes elementary functions and their properties and is able to solve equations consisting of elementary functions. - can decide when a function is analytic and knows the main features of such functions - is able to calculate complex integrals using the fundamental theorem of analysis, integral theorems, and formulas. - can find the Laurent's series for a given function,and knows when the series represents the original function. - can find zeros and poles of a function from its Laurent's series - can compute complex integrals using residues. - can make logical conclusions, ie. is able to make mathematical proofs.

Content

Content Core content Complementary knowledge Specialist knowledge
1. Complex numbers and elementary functions. Complex plane and its topology. Complex function.    Applications 
2. Continuous and differentiable functions. Analytical Fuctions. Cauchy-Riemann and Laplace equations.    Applications: - Elliptic partial differential equations 
3. Complex Integral. The fundamental theorem of analysis. Cauchy's integral theorem, Cauchy's integral formula      
4. Taylor's and Laurent's series. Residue.  Zeros of Riemann's function   

Study material

Type Name Author ISBN URL Additional information Examination material
Book   Complex Analysis for Mathematics and Engineering   Mathews& Howell         No   
Book   Complex Variables and Applications   Brown&Churchill   0-07-114065-4       No   

Prerequisites

Course Mandatory/Advisable Description
MAT-01400 Insinöörimatematiikka X 4 Advisable   1
MAT-01410 Insinöörimatematiikka A 4 Advisable   1
MAT-01430 Insinöörimatematiikka C 4 Advisable   1
MAT-01460 Matematiikka 4 Advisable   1
MAT-01466 Mathematics 4 Advisable   1

1 . Engineering Mathematics or Mathematics (19 cr)

Additional information about prerequisites
Recommended prerequisite information consists of Engineering Mathematics (19 cr), Mathematics (19 cr), or any combination of courses with corresponding contents. In particular basic knowledge of (multivariate) differentiation and integration of real functions is required.



Correspondence of content

Course Corresponds course  Description 
MAT-60106 Complex Analysis, 5 cr MAT-60100 Complex Analysis, 5 cr  
MAT-60106 Complex Analysis, 5 cr MAT-31086 Complex Analysis, 5 cr  

Updated by: Laakkonen Petteri, 10.12.2018