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Theory of analytic functions

Code: 61562
ECTS: 5.0
Lecturers in charge: prof. dr. sc. Boris Širola
Lecturers: prof. dr. sc. Boris Širola - Exercises
English level:

1,0,0

All teaching activities will be held in Croatian. However, foreign students in mixed groups will have the opportunity to attend additional office hours with the lecturer and teaching assistants in English to help master the course materials. Additionally, the lecturer will refer foreign students to the corresponding literature in English, as well as give them the possibility of taking the associated exams in English.
Load:

1. komponenta

Lecture typeTotal
Lectures 30
Exercises 15
* Load is given in academic hour (1 academic hour = 45 minutes)
Description:
COURSE AIMS AND OBJECTIVES: The aim is to work out advanced chapters of the theory of functions of complex variable, continuing the course Complex Analysis from the 3rd year of Bsc study of Mathematics.

COURSE DESCRIPTION AND SYLLABUS:
1. Integrals of Cauchy's type; index of a curve, connectedness, homotopy and simple connectedness; Jordan's theorem; global Cauchy's theorem; theorem on residua; Rouche's theorem; Vitali's theorem; Montel's theorem; Riemann's theorem.
2. Singularities of ordinary differential equations; the equations of Fuchs' type; the hypergeometric equation; orthogonal polynomials and functions; the Bessel's functions.
3. Entire and meromorphic functions; Mittag-Leffler's theorem; Weierstrass' factorization theorem; rank, order and genus of an entire function; Hadamard's canonical factorization theorem.
4. Elliptic functions; the Weierstrass' p-function and its Laurent's series; the Eisenstein's series and the invariants g2 and g3; the discriminant; the Klein's modular function; Fourier's expansions; Mobius transformations and the modular group; fundamental domains; modular functions.
5. Riemann's surfaces; harmonoic functions; the fundamental group and coverings; the uniformization theorem.
Remark: This is a list of possible themes for this elective course. The realisation can change each year, depending on the affinity of the lecturer and on the interest of the students.
Literature:
3. semester
Analiza - Regular study - Mathematics Education

4. semester Not active
Analiza - Regular study - Mathematics Education
Consultations schedule: