Czech

prof. RNDr. Jan Franců, CSc.

Institute of Mathematics

Knowledge of basic topics of the metric, linear normed and unitary spaces,
Lebesgue integral and ability to apply this knowledge in practice.

Differential and integral calculus, numerical methods, ordinary differential equations.

The course is taught through lectures explaining the basic principles and theory of the discipline.

Examination has a practical and a theoretical part. In the practical part student has to illustrate the given topics on particular examples. Theoretical part includes questions related to the subject-matter presented at the lectures.

The aim of the course is to familiarise students with basic topics of the functional analysis and function spaces theory and their application to analysis of problems of mathematical physics.

Absence has to be made up by self-study using lecture notes.

Programme D-APM-P: Applied Mathematics, Doctoral, recommended course

Programme D-APM-K: Applied Mathematics, Doctoral, recommended course

20 hours, optionally

1 Metric and metric spaces, examples.
2 Linear and normed linear spaces, Banach spaces.
3 Scalar product and Hilbert spaces.
4 Examples of spaces: R^n, C^n, sequential spaces, spaces of continuous and integrable functions.
5 Elements of Lebesgue integral, Lebesgue spaces.
6 Generalized derivations, Sobolev spaces.
7 Traces. Theorem on traces.
8 Imbedding theorems. Density theorem.
9 Lax-Milgram lemma and its application to solvability if differential equations.
10 Relation between differential and integral equations.