| Course title | Mathematical Structures |
|---|---|
| Course code | KMA/MSR |
| Organizational form of instruction | Lecture + Seminar |
| Level of course | Master |
| Year of study | not specified |
| Semester | Winter and summer |
| Number of ECTS credits | 5 |
| Language of instruction | Czech |
| Status of course | unspecified |
| Form of instruction | Face-to-face |
| Work placements | This is not an internship |
| Recommended optional programme components | None |
| Lecturer(s) |
|---|
|
| Course content |
|
Continuous structures: metric spaces, topological spaces, uniformity, uniform spaces, metrizability. Discrete structures: algebraic structures, algebraic methods of graph theory, matroids, duality.
|
| Learning activities and teaching methods |
One-to-One tutorial, Task-based study method, Individual study, Self-study of literature
|
| prerequisite |
| Knowledge |
| Student are supposed to have knowledge in Graph Theory and Computational Complexity corresponding to the contents of the courses KMA/TGD1 and KMA/TGD2 and knowledge in Functional Analysis corresponding to the contents of the course KMA/UFA. |
| learning outcomes |
| The student will have an overview of deeper connections between some seemingly unrelated parts of Mathematics. |
| teaching methods |
| Task-based study method |
| Self-study of literature |
| Individual study |
| One-to-One tutorial |
| assessment methods |
| Oral exam |
| Individual presentation at a seminar |
| Recommended literature |
|
| Study plans that include the course |
| Faculty | Study plan (Version) | Category of Branch/Specialization | Recommended semester |
|---|