|
|
|
||
Last update: doc. RNDr. Karel Houfek, Ph.D. (14.05.2023)
|
|
||
Last update: Mgr. Kateřina Mikšová (09.02.2022)
Final examination (written and oral) takes place during the examination period and students must first obtain the credit for practical exercises. Credit for exercises is based on the solution of take-home problems (34%) and two tests (midterm and final, each 33%). |
|
||
Last update: doc. RNDr. Karel Houfek, Ph.D. (14.05.2023)
T. Needham, Visual Complex Analysis, Oxford Univeristy Press, 1999. Lecture notes, materials for practical exercises. |
|
||
Last update: doc. RNDr. Karel Houfek, Ph.D. (02.05.2023)
The requirements for the exam correspond to the course syllabus to the extent that was given in the lectures and exercises. |
|
||
Last update: doc. RNDr. Karel Houfek, Ph.D. (17.05.2024)
Hilbert space, Hilbert space and Fourier series. Orthogonal polynomial systems. Operators on Hilbert space. Complex analysis, Cauchy’s theorem, Cauchy’s integral formula, Residue theorem and its applications Introduction to partial differential equations. Heat equation, wave equation, Laplace’s and Poisson’s equation. Introduction to the theory of distributions. |