Course unit code: 
FASTDA01 
Academic year: 
2017/2018 
Type of course unit: 
optional 
Level of course unit: 
Doctoral (3rd cycle) 
Year of study: 
1 
Semester: 
summer 
Number of ECTS credits: 
4 
Learning outcomes of the course unit:
The findings concerning the typical problems solved within the numerical analysis,
understanding of the elementary numerical procedures for their approximate solutions and their essential properties and
the ability to solve elementary typical concrete problems numerically.


Mode of delivery:
20 % facetoface, 80 % distance learning


Prerequisites:
Basics of linear algebra and vector calculus. Basics of the theory of one and morefunctions (limit, continuous functions, graphs of functions, derivative, partial derivative). Basics of the integral calculus of one and twofunctions.


Corequisites:
Not applicable.


Recommended optional programme components:
Not applicable.


Course contents (annotation):
Errors in numerical calculations and numerical methods for one nonlinear equation in one unknown.
Iterative methods. The Banach fixedpoint theorem.
Iterative methods for the systems of linear and nonlinear equations.
Direct methods for the systems of linear algebraic equations, matrix inversion, eigenvalues and eigenvectors of matrices.
Interpolation and approximation of functions. Splines.
Numerical differentiation and integration. Extrapolation to the limit.


Recommended or required reading:
DALÍK, J.: Numerické metody. CERM Brno 1997 HOROVÁ, I., ZELINKA, J.: Numerické metody. Masarykova univerzita v Brně 2004 MIKA, S.: Numerické metody algebry. SNTL Praha 1982 PŘIKRYL, P., BRANDNER, M.: Numerické metody II. ZČU Plzeň 2000


Planned learning activities and teaching methods:
Not applicable.


Assesment methods and criteria linked to learning outcomes:
Not applicable.


Language of instruction:
Czech


Work placements:
Not applicable.


Course curriculum:
1. Errors in numerical calculations. Numerical methods for one nonlinear equation in one unknown
2. Basic principles of iterative methods. The Banach fixedpoint theorem.
3. Norms of vectors and of matrices, eigenvalues and eigenvectors of matrices. Iterative methods for systems of linear algebraic equations– part I.
4. Iterative methods for linear algebraic equations– part II. Iterative methods for systems of nonlinear equations.
5. Direct methods for systems of linear algebraic equations, LUdecomposition. Systems of linear algebraic equations with special matrice – part I.
6. Systems of linear algebraic equations with special matrices – part II. The methods based on the minimization of a quadratic form.
7. Computing inverse matrices and determinants, the stability and the condition number of a matrix.
8. Eigenvalues of matrices  the power method. Basic principles of interpolation.
9. Polynomial interpolation.
10. Interpolation by means of splines. Orthogonal polynoms.
11. Approximation by the discrete least squares.
12. Numerical differentiation, Richardson´s extrapolation. Numerical integration of functions in one variables– part I.
13. Numerical integration of functions in one variables– part II. Numerical integration of functions in two variables.


Aims:
After the course the students should understand the main priciples of numeric calculation and the factors influencing calculation. They should be able to solve selected basic problems of numerical analysis, using iteration methods to solve the f(x)=0 equation and systems of linear algebraic equations using calculation algorithms. Theu should learnhow to approximate eigenvalues and eigenvectors of matrices. They should learn about the basic problems in interpolation and approximation of functions solving silple practical problems. Theu should be acquainted with tyhe principles of numeric differentiation and know how to numerically approximate integral of one and twofunctions.


Specification of controlled education, way of implementation and compensation for absences:
Extent and forms are specified by guarantor’s regulation updated for every academic year.

