Study programmes
Computational mathematics
Study program:
Computational mathematics
SP code:
P0541D170010
Study form:
full-time
Study type:
doctoral
Standard duration of study in years:
4
Language of instruction:
Czech
Title:
Ph.D.
Title:
No
More details
SP name in English:
Computational mathematics
SP name in Latin:
Mathesis numerorum theoriae ac computationibus accommodata
SP profile:
academically oriented
SP characteristics
The study programme provides advanced theoretical and practical knowledge of the computational mathematics, which deals with
solution of mathematical problems describing
phenomena in natural, technical and social sciences. The study is focused on the understanding of problems in a wider context.
The study includes the theoretical aspects of the methods of the computational mathematics as well as a computer solution of the mathematical tasks
motivated by practical problems. The students are prepared for development of the field itself as well as to employ the achieved knowledge
in solving mathematical problems in natural and applied sciences.
solution of mathematical problems describing
phenomena in natural, technical and social sciences. The study is focused on the understanding of problems in a wider context.
The study includes the theoretical aspects of the methods of the computational mathematics as well as a computer solution of the mathematical tasks
motivated by practical problems. The students are prepared for development of the field itself as well as to employ the achieved knowledge
in solving mathematical problems in natural and applied sciences.
More details
Graduate profile for the public:
The graduate obtains deep theoretical knowledge and practical skills for numerical solution of various problems
arising in natural, technical and social sciences. The graduate is able propose an optimal solution for the given problem. That is, he/she
is able choose a suitable method, analyze it and implement on computers. He/she is able to interpret the output and possibly propose a modification of the method.
The graduate is able to identify limits of the considered approaches and to evaluate appropriateness of the methods and implementations
in commercial software. The graduate can find a job in science and technology in natural, technical and social sciences in private sector
as well as public sectors.
arising in natural, technical and social sciences. The graduate is able propose an optimal solution for the given problem. That is, he/she
is able choose a suitable method, analyze it and implement on computers. He/she is able to interpret the output and possibly propose a modification of the method.
The graduate is able to identify limits of the considered approaches and to evaluate appropriateness of the methods and implementations
in commercial software. The graduate can find a job in science and technology in natural, technical and social sciences in private sector
as well as public sectors.
Related accreditations
| Faculty | Name of the study program | Language of instruction | Study form |
|---|---|---|---|
| Matematicko-fyzikální fakulta | Numerická a výpočtová matematika | čeština | kombinovaná |
| Matematicko-fyzikální fakulta | Computational mathematics | angličtina | prezenční |
| Matematicko-fyzikální fakulta | Computational mathematics | angličtina | kombinovaná |
Teaching provided by
Faculty:
- Faculty of Mathematics and Physics (MFF) https://www.mff.cuni.cz
Cooperating institutions:
- Institutions:
- Institute of Mathematics of the CAS
- Institute of Computer Science of the CAS
- Institute of Thermomechanics of the CAS
- Institute of Information Theory and Automation of the CAS
More details
Foreign university joint diploma type:
No
External department:
No
Classification
Area of education:
- Mathematics
SP structure
Specialisation:
No
Double-curriculum study:
No
Data for persons with disabilities
Contact person for persons with disability:
Mgr. Lukáš Krump, Ph.D.
Web page for persons with disability:
Further information about the study of persons with disability:
Personal provision
Garant SP:
- prof. Mgr. Petr Knobloch, Dr., DSc.
More details
Subject Area Board Members:
- Chairman, Knobloch Petr, prof. Mgr., Dr., DSc. (from 18.5.2021)
- Members, Bodnár Tomáš, doc. Mgr. Ing., Ph.D. (from 16.6.2025)
- Members, Carson Erin Claire, doc., Ph.D. (from 16.6.2025)
- Members, Dolejší Vít, prof. RNDr., Ph.D., DSc. (from 19.5.2021)
- Members, Hnětynková Iveta, doc. RNDr., Ph.D. (from 16.6.2025)
- Members, Kruis Jaroslav, prof. Ing., Ph.D. (from 10.7.2019)
- Members, Kučera Václav, doc. RNDr., Ph.D. (from 10.7.2019)
- Members, Mikyška Jiří, prof. Ing., Ph.D. (from 16.6.2025)
- Members, Rozložník Miroslav, doc. Ing., Dr. (from 10.7.2019)
- Members, Strakoš Zdeněk, prof. Ing., DrSc. (from 10.7.2019)
- Members, Sváček Petr, doc. RNDr., Ph.D. (from 10.7.2019)
- Members, Tichý Petr, doc. RNDr., Ph.D. (from 10.7.2019)
- Members, Tůma Karel, RNDr., Ph.D. (from 16.6.2025)
- Members, Tůma Miroslav, prof. Ing., CSc. (from 10.7.2019)
- Members, Vejchodský Tomáš, doc. RNDr., Ph.D. (from 10.7.2019)
- Former/future members of SAB:
- Chairman, Dolejší Vít, prof. RNDr., Ph.D., DSc. (19.12.2018 - 18.5.2021)
- Members, Knobloch Petr, prof. Mgr., Dr., DSc. (10.7.2019 - 18.5.2021)
Instruction
Admission procedure requirements:
Study programme (branch) is open for applicants for the academic year
2026/2027:
- Faculty of Mathematics and Physics - Admission procedure requirements
Admission procedure requirements in the acaademic year
2025/2026:
- Faculty of Mathematics and Physics - Admission procedure requirements
Can be studied in combination
No combinations have been found
