CZECH TECHNICAL UNIVERSITY IN PRAGUE
STUDY PLANS
2019/2020

Multidimensional Analysis

The course is not on the list Without time-table
Code Completion Credits Range Language
A1B01MA2 Z,ZK 6 2+2 Czech
The course cannot be taken simultaneously with:
Multidimensional Calculus (A2B01MA3)
Mathematics 2 (A3B01MA2)
Enrollement in the course requires an assessment of the following courses:

Lecturer:
Tutor:
Supervisor:
Department of Mathematics
Synopsis:

The aim of the course is to introduce students to basics of differential and integral calculus of functions of more variables and to basics of series of numbers and functions.

Requirements:
Syllabus of lectures:

1.Functions of more variables: Limit, continuity.

2.Directional and partial derivative - gradient.

3.Derivative of a composition of functions, higher order derivatives.

4.Jacobi matrix. Local extrema.

5.Extrema with constraints, Lagrange multipliers.

6.Double and triple integral - Fubini theorem and theorem on substitution.

7.Path integral and its applications.

8.Surface integral and its applications.

9.The Gauss, Green, and Stokes theorem. Potential of a vector field.

10.Basic convergence tests for series of numbers.

11.Series of functions, the Weirstrasse test.

12.Power series, radius of convergence. Taylor series.

13.Fourier series.

Syllabus of tutorials:

1.Functions of more variables: Limit, continuity.

2.Directional and partial derivative - gradient.

3.Derivative of a composition of functions, higher order derivatives.

4.Jacobi matrix. Local extrema.

5.Extrema with constraints, Lagrange multipliers.

6.Double and triple integral - Fubini theorem and theorem on substitution.

7.Path integral and its applications.

8.Surface integral and its applications.

9.The Gauss, Green, and Stokes theorem. Potential of a vector field.

10.Basic convergence tests for series of numbers.

11.Series of functions, the Weirstrasse test.

12.Power series, radius of convergence. Taylor series.

13.Fourier series.

Study Objective:
Study materials:

1. L. Gillman, R. H. McDowell, Calculus, W. W. Norton &amp; Co., New York, 1973.

2. S. Lang, Calculus of several variables, Springer Verlag, 1987.

Note:
Further information:
No time-table has been prepared for this course
The course is a part of the following study plans:
Data valid to 2020-01-17
For updated information see http://bilakniha.cvut.cz/en/predmet12573604.html