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Last update: T_KMA (16.05.2012)
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Last update: doc. RNDr. Pavel Pyrih, CSc. (28.10.2019)
Following the lessons. |
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Last update: T_KMA (16.05.2012)
Sam B. Nadler, Jr, Continuum theory. An introduction. Pure and Applied Mathematics, Marcel Dekker (1992) ISBN 0-8247-8659-9. |
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Last update: doc. RNDr. Pavel Pyrih, CSc. (28.10.2019)
The goals are examples and applications. |
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Last update: doc. RNDr. Pavel Pyrih, CSc. (30.04.2020)
The exam has an oral form with written preparation. The student will be given a topic for which he will prepare related sentences, definitions and evidence.
The form of the exam will be full-time or distance and will always be specified in the SIS for individual dates.
The full-time form of the exam will take place in the lecture room listed in the SIS.
The distance form of the exam will take place in the Zoom environment and will be a modification of the full-time form. |
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Last update: T_KMA (16.05.2012)
The course will cover all basic topics from Continuum theory:
1. The construction of continua as nested sequences
2. Continuum as a inverse limit
3. Decomposition of continua
4. Theorems about limits
5. Boundary bumping theorem
6. Existence of non-cut points
7. A general mapping theorem
8. Peano continua
9. Graphs
10. Dendrites
11. Irreducible continua
12. Arc-like continua
13.Special types of maps and their properties |
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Last update: doc. RNDr. Pavel Pyrih, CSc. (07.05.2018)
For the course one year of study at any specialization on MFF is sufficient. |