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Last update: doc. RNDr. Pavel Pyrih, CSc. (04.05.2018)
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Last update: doc. Mgr. Marek Cúth, Ph.D. (01.02.2022)
The exam is oral and its range depends on the lecture. |
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Last update: doc. Mgr. Benjamin Vejnar, Ph.D. (29.10.2019)
Literature will be specified during the first lecture. |
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Last update: doc. Mgr. Marek Cúth, Ph.D. (01.02.2022)
Studenti si dělají zápisky z přednášek, kde lektor vykládá látku |
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Last update: doc. RNDr. Pavel Pyrih, CSc. (04.05.2018)
1. Metric, metric spaces, continuous and uniformly continuous mappings, homeomorphism, isometry. Open and closed sets, interion, closure, boundary. Subspace, sum and product of metric spaces. 2. Totally bounded and separable metric spaces.
3. Complete metric spaces, completion, Cantor theorem, Baire theorem.
4. Compact metric spaces, Cantors discontinuum, Hilbert cube.
5. Connected metric spaces.
6. Hausdorff metric. |