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Last update: G_I (11.04.2003)
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Last update: doc. RNDr. Martin Klazar, Dr. (14.05.2020)
Oral exam, with written preparation. Exam question are/will be given on the course page, see teacher's web page.
Prerequisity for taking exam is to get the ``zapocet''. It will be granted for working out at least 1/2 of homeworks. There are no make up terms for getting the ``zapocet''. ************************************************************************ As to situation caused by the current coronavirus pandemia in spring and summer 2020. Form of exam (contact or distant) will be determined for each term in SIS according to actual situation. Contact exam will be writen one with possible oral part. For this course the contact form in small groups (<6, <11 people) appears probable. |
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Last update: doc. RNDr. Martin Klazar, Dr. (12.10.2017)
Preliminary lecture notes in English are available from the teacher (A. Pultr) upon request. |
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Last update: doc. RNDr. Martin Klazar, Dr. (14.05.2020)
Oral exam, with written preparation. Exam question are/will be given on the course page, see teacher's web page.
Prerequisity for taking exam is to get the ``zapocet''. It will be granted for working out at least 1/2 of homeworks. There are no make up terms for getting the ``zapocet''. ************************************************************************ As to situation caused by the current coronavirus pandemia in spring and summer 2020. Form of exam (contact or distant) will be determined for each term in SIS according to actual situation. Contact exam will be writen one with possible oral part. For this course the contact form in small groups (<6, <11 people) appears probable. |
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Last update: prof. RNDr. Aleš Pultr, DrSc. (11.10.2017)
1.Introduction: various structures the students have already met. Comparison, special features. Combining structures. Relations and relational systems, some general constructions. 3. Partially ordered sets, generalities: posets, monotone maps, suprema and infima, adjunction. 4. Special posets (requiring specific or all suprema resp. infima, lattices and complete lattices. Fixed point theorems, applications. Distributive lattices, Heyting and Boolean algebras. 5. Algebraic operations, algebras, homomorphisms. Some general constructions (remarks on universal algebra). Varieties of algebras. 6. Structure of spaces. Metric spaces, topological spaces. 7. Remarks on some other types of structures. 8. Common features of some constructions: subobjects, quotients, products, sums, equalizers, etc.
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