Module MA5034-KP05
Calculus of Variations and Partial Differential Equations (VarPDGKP05)
Duration
1 Semester
Turnus of offer
every second summer semester
Credit points
5
Course of studies, specific fields and terms:
- Master CLS 2023, optional subject, mathematics
- Bachelor CLS 2023, optional subject, mathematics
- Bachelor CLS 2016, optional subject, mathematics
- Master CLS 2016, optional subject, mathematics
Classes and lectures:
- Calculus of Variations and Partial Differential Equations (exercise, 1 SWS)
- Calculus of Variations and Partial Differential Equations (lecture, 2 SWS)
Workload:
- 65 hours private studies and exercises
- 45 hours in-classroom work
- 10 hours exam preparation
- 30 hours work on project
Contents of teaching:
- Motivation and application examples
- Functional-analytic foundations
- Direct methods in the calculus of variations
- The dual space, weak convergence, Sobolev spaces
- Optimality conditions
- Classification of partial differential equations and typical PDEs
- Fundamental solutions, maximum principle
- Finite elements for elliptical partial differential equations
Qualification-goals/Competencies:
- Students understand variational modeling.
- They are able to formulate basic physical problems in a variational setting.
- They understand the connections between variational methods and partial differential equations.
- They can derive optimality conditions for energy functionals.
- They understand the mathematical theory behind selected variational problems.
- They can implement selected fundamental variational problems.
- They can formulate selected practical problems in the variational setting.
- Interdisciplinary qualifications:
- Students have advanced skills in modeling.
- They can translate theoretical concepts into practical solutions.
- They are experienced in implementation.
- They can think abstractly about practical problems.
Grading through:
- Written or oral exam as announced by the examiner
Responsible for this module:
Literature:
- Vogel : Computational Methods for Inverse Methods SIAM
- Aubert, Kornprobst : Mathematical Problems in Image Processing: Partial Differential Equations and the Calculus of Variations Springer
- Scherzer, Grasmair, Grossauer, Haltmeier, Lenzen : Variational Methods in Imaging Springer
Language:
- German and English skills required
Notes:
Prerequisites for attending the module:- None (Familiarity with the topics of the required modules is assumed, but the modules are not a formal prerequisite for attending the course).
Prerequisites for the exam:
- Homework assignments and their presentation are ungraded examination prerequisites which have to be completed and positively evaluated before the first examination.
Examination:
- MA5034-L1: Calculus of Variations and Partial Differential Equations, written examination (90 min) or oral examination (30 min) as decided by examiner, 100 % of final mark
Last Updated:
22.02.2022