Study programmes

The study program Mathematical analysis provides to the students advanced knowledge in several branches of mathematics which are traditionally considered to belong to mathematical analysis (theory of real functions, complex analysis, functional analysis, theory of both ordinary and partial differential equations). It is characterized by a deep insight to these branches and focus on their mutual connections. Advanced level of basic knowledge in these branches is reached by attending mandatory courses. In elective courses students deepen their knowledge in more narrow areas, chosen namely with respect to the topic of their master thesis. Thanks to the seminars the students may be in touch with current problems of mathematical research.
Mathematical analysis is a wide well-established area with narrow connections to other parts of mathematics. Methods of mathematical analysis are used, among others, in the probability theory, in numerial mathematics and for creating and examining mathematical models (in physics or other sciences). Students may encounter these connections in some of the elective courses. Aims of the program include preparation for a PhD study of matematical analysis or related areas at the Charles university or at another university. Students encounter applications of mathematical theories, theorems and methods for solving concrete problems. Therefore their future employment is not limited to academic positions.