Theory of Functions of Complex Variable

Course: Physics

Structural unit: Faculty of Physics

Title
Theory of Functions of Complex Variable
Code
ОК 26.
Module type
Обов’язкова дисципліна для ОП
Educational cycle
First
Year of study when the component is delivered
2021/2022
Semester/trimester when the component is delivered
3 Semester
Number of ECTS credits allocated
3
Learning outcomes
Know the concepts of complex numbers and operations with them: product, division, addition and subtraction Know the basic theorems of differential calculus of functions of a complex argument Know the basic theorems of integral calculus of functions of a complex argument, in particular theorems on integration of analytic functions Know the main results of the theory of analytic functions, Taylor and Laurent series Know the classification of special points of functions and the basic properties of excess functions Be able to perform algebraic operations with complex numbers Be able to differentiate the functions of a complex argument Be able to integrate the functions of a complex argument on the contour Be able to decompose the functions of a complex argument into Taylor and Laurent series Be able to apply the theory of surpluses in the calculation of denoted integrals, summation of series, solution of linear differential equations
Form of study
Full-time form
Prerequisites and co-requisites
1. Know the basics of algebra and analysis, differential and integral calculus of functions of a real argument. 2. To be able to solve problems in mathematical analysis, to have differential and integral calculus of functions of a real argument. 3. Have the skills to study literature, work with interactive and multimedia tools, interact with colleagues during training.
Course content
Мodule 1. Complex numbers, functions and operations with them 1. Complex numbers and operations with them 2. Functions of a complex variable Мodule 2. Application of TFKZ methods in problems of matanalysis and differential equations 3. The theory of surpluses and its application 4. Operational calculus and asymptotic analysis
Recommended or required reading and other learning resources/tools
Planned learning activities and teaching methods
• lectures • practical training • consultations • individual work
Assessment methods and criteria
• control works • modular control • homework check • examination work
Language of instruction
Ukrainian

Lecturers

This discipline is taught by the following teachers

Departments

The following departments are involved in teaching the above discipline