Lecturer(s)
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Škvor Jiří, RNDr. Ph.D.
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Kubera Petr, RNDr. Ph.D.
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Barilla Jiří, doc. Ing. Mgr. CSc.
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Sýkorová Květuše, Mgr.
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Course content
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1. Function approximation, Lagrange interpolation 2. Definition of spline function, interpolation via spline-construction, derivation 3. Numerical quadrature, Newton-Cotes rules 4. Romberg's quadrature method, Gaussian quadrature rules 5. Method for nonlinear equations, Newton's (Newton-Rhapson) method 6. Fixed point method, root finding for polynomials, Horner scheme 7. System of linear equation, conditional number, Gaussian elimination 8. LU factorization, Cholesky and QR factorization 9. Basic iterative methods for the solution of linear algebraic equations 10. Eigenvalues of matrix, power method 11. Numerical solution of ODE, one step methods, Runge-Kutta methods 12. Gradient methods
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Learning activities and teaching methods
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unspecified
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Learning outcomes
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Introduction to numerical mathematics for students of computer science.
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Prerequisites
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Teaching in English is meant only for erasmus and foreign students. In the case of a small number of students is teaching in a form of individual consultations.
KMA/P136
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Assessment methods and criteria
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unspecified
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Recommended literature
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Mathematics. Springer, Berlin. ISBN 0-387-98959-5.
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Felcman J. Numerická matematika. 2013.
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Quarteroni, A., Sacco, R., and Saleri, F. Numerical Mathematics (2ndedn), Volume 37 of Texts in Applied Mathematics. Springer, Berlin. ISBN 0-387-98959-5..
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Segethova, J. Základy numerické matematiky. Karolinum, Praha..
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Ueberhuber, W. Numerical Computation 1, 2: Methods, Software, and Analysis. Springer, Berlin..
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