SylabUZ
Course name | Iterative methods for fixed point problems in Hilbert spaces |
Course ID | 11.1-WK-MATT-ItMetForFixPPrInHilbSp-S18 |
Faculty | Faculty of Mathematics, Computer Science and Econometrics |
Field of study | Mathematics |
Education profile | academic |
Level of studies | PhD studies |
Beginning semester | winter term 2018/2019 |
Semester | 4 |
ECTS credits to win | 2 |
Course type | obligatory |
Teaching language | polish |
Author of syllabus |
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The class form | Hours per semester (full-time) | Hours per week (full-time) | Hours per semester (part-time) | Hours per week (part-time) | Form of assignment |
Lecture | 30 | 2 | - | - | Credit |
In these lectures we present iterative methods for finding fixed points of a wide class of operators in Hilbert spaces in a consolidated way. We introduce some classes of operators, give their properties, define iterative methods generated by operators from these classes, and present general convergence theorems. On this basis we present the conditions under which particular methods converge.
Zaliczone kursy: analiza matematyczna 1-2, algebra liniowa 1-2, podstawy optymalizacji, analiza funkcjonalna.
tradycyjny wykład audytoryjny
Outcome description | Outcome symbols | Methods of verification | The class form |
Egzamin z problemami o zróżnicowanym stopniu trudności, pozwalającymi na ocenę, czy student osiągnął efekty kształcenia w stopniu minimalnym.
Modified by dr Alina Szelecka (last modification: 14-07-2018 09:00)