Course detail

Mathematical Structures

FSI-SSR-A Acad. year: 2024/2025 Summer semester

The course will familiarise students with basic concepts and results of the theory of mathematical structures. A number of examples of concrete structures which students know from previously passed mathematical subjects will be used to demonstrate the exposition.

Language of instruction

English

Number of ECTS credits

4

Entry knowledge

Students are expected to know the following subjects taught within the bachelor's study programme: Mathermatical Analysis I-III, Functional Analysis, both Linear and General Algebra, and Methods of Discrete Mathematics. Concerning the the master's study programme, knowledge of Graph Theory is required.

Rules for evaluation and completion of the course

The course is completed with an exam. Students' knowledge will be assessed based on a writen test and oral exam.


Since the attendance at lectures is not compulsory, it will not be checked, and compensation of possible absence will not be required.

Aims

The aim of the course is to show the students possibility of a unified perspective on seemingly different mathematical subjects and constructions.


Students will acquire the ability of viewing different mathematical structures and constructions from a unique, categorical point of view. This will help them to realize new relationships and links between different branches of mathematics. The students will also be able to apply their knowledge of the theory of mathematical structures, e.g. in computer science.

The study programmes with the given course

Programme N-MAI-A: Mathematical Engineering, Master's, compulsory

Programme N-MAI-P: Mathematical Engineering, Master's, compulsory

Programme N-AIM-A: Applied and Interdisciplinary Mathematics, Master's, compulsory

Programme C-AKR-P: , Lifelong learning
specialization CLS: , elective

Type of course unit

 

Lecture

26 hours, optionally

Syllabus

1. Sets and classes
2. Mathematical structures
3. Isomorphisms
4. Fibres
5. Subobjects
6. Quotient objects
7. Free objects
8. Initial structures
9. Final structures
10.Cartesian product
11.Cartesian completeness
12.Functors
13.Reflection and coreflection