Course title | Foundations of Analysis in the Complex D |
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Course code | KMA/UKA |
Organizational form of instruction | Lecture + Lesson |
Level of course | Bachelor |
Year of study | not specified |
Semester | Winter |
Number of ECTS credits | 8 |
Language of instruction | Czech |
Status of course | unspecified |
Form of instruction | Face-to-face |
Work placements | Course does not contain work placement |
Recommended optional programme components | None |
Course availability | The course is available to visiting students |
Lecturer(s) |
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Course content |
It will be concreted when the subject is tought.
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Learning activities and teaching methods |
Monological explanation (lecture, presentation,briefing), Written assignment presentation and defence
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Learning outcomes |
Derivative with respect to the complex variable, holomorphic function and Cauchy-Riemann Conditions. Curvilinear Integrals. Cauchy's Theorem and Cauchy's Formula. Power series, isolated singularities of holomorphic series. Laurent series. Residue theorem and there applications. Conformal Mapping.
Knowlige of fundamentals of function theory. |
Prerequisites |
Passing of mathematical lectures of first four semestrs.
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Assessment methods and criteria |
Oral exam, Written exam
Credit: Working out a semestral work. Exam: Written. |
Recommended literature |
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Study plans that include the course |
Faculty | Study plan (Version) | Category of Branch/Specialization | Recommended semester |
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