Lecturer(s)
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Mikeš Josef, prof. RNDr. DrSc.
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Course content
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Introduction to geodesic, holomorphically-projective and F-planar mappings of spaces with affine connection and Riemannian spaces.
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Learning activities and teaching methods
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Work with Text (with Book, Textbook)
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Learning outcomes
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Sumarize the principles of geodesic, holomorphically-projective and F-planar mappings of spaces with affine connection and Riemannian spaces.
1. Knowledge Describe the theory of diffeomorphisms.
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Prerequisites
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Knowledge the principles on university mathematics level.
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Assessment methods and criteria
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Oral exam, Written exam
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Recommended literature
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Kobayashi S.,Nomizu K. (1969). Foundations of Differential geometry I, II. Willey.
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Kolář I.,Michor P.W.,Slovák J. (1993). Natural Operators in Differential Geometry. Springer.
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Krupka D.,Janyška J. (1990). Lectures on Differential Invariants. Brno.
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Mikeš, J., Kiosak, V., Vanžurová, A. (2008). Geodesics Mappings of Manifolds with Affine Connection. Olomouc, Palackého univerzita.
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Sinyukov, N. S. (1979). Geodesic mappings of Riemannian spaces. Nauka Moskva.
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