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This entry is from Winter semester 2016/17 and might be obsolete. No current equivalent could be found.

M.Sc. Business Mathematics — Specialization and Practical Modules in Mathematics

Modules totaling 33 LP must be selected in this area of study. The number of modules on Pure Mathematics (marked with an "R") is limited by the fact that at least 18 LP must be completed in modules on Applied Mathematics ("A"). For Applied Mathematics, an advanced module from Stochastics must also be chosen, unless such a module has already been taken in the Bachelor's program. A maximum of one advanced module may be taken. In addition, one of the three internships must be completed.

List of modules in this area of study:

Sorted: alphabetical, by classification, by level and CP

Advanced module, 6 CP

• Advanced Module Numerical Mathematicss/Optimization (6 ECTS) (Advanced module, 6 CP, A)
• Advanced Module Stochastics (6 ECTS) (Advanced module, 6 CP, A)
• Discrete Geometry (Advanced module, 6 CP, R)
• Statistics (Advanced module, 6 CP, A)

Advanced module, 9 CP

• Advanced Module Numerical Mathematics/Optimization (9 ECTS) (Advanced module, 9 CP, A)
• Advanced Module Stochastics (9 ECTS) (Advanced module, 9 CP, A)
• Elementary Stochastics (Advanced module, 9 CP, A)
• Functional Analysis (Advanced module, 9 CP, R)
• Mathematical Data Analysis (Advanced module, 9 CP, A)
• Numerical Analysis (Advanced module, 9 CP, A)
• Optimization (Advanced module, 9 CP, A)

Specialization module, 3 CP

• Asymptotical Statistics (Specialization module, 3 CP, A)
• Specialization Module Stochastics (3 ECTS) (Specialization module, 3 CP, A)

Specialization module, 6 CP

• Adaptive Numerical Methods for Operator Equations (Specialization module, 6 CP, A)
• Compressive Sensing (Specialization module, 6 CP, A)
• Computer Aided Geometric Design (Specialization module, 6 CP, A)
• Extreme value theory (Specialization module, 6 CP, A)
• Finite Frames (Specialization module, 6 CP, A)
• Non-Parametric Statistics (Specialization module, 6 CP, A)
• Numerical Solution Methods for Elliptical Partial Differential Equations (Specialization module, 6 CP, A)
• Quantitative Risk Management (Specialization module, 6 CP, A)
• Regularity Theory of Elliptic Partial Differential Equations (Specialization module, 6 CP, A)
• Special Methods for Initial Value Problems (Specialization module, 6 CP, A)
• Specialization Module Numerical Mathematics/Optimization (6 ECTS) (Specialization module, 6 CP, A)
• Specialization Module Optimization (6 ECTS) (Specialization module, 6 CP, A)
• Specialization Module Stochastics (6 ECTS) (Specialization module, 6 CP, A)
• Stochastic processes (Specialization module, 6 CP, A)
• Time Series Analysis (Specialization module, 6 CP, A)
• Wavelet Analysis I (Specialization module, 6 CP, A)
• Wavelet Analysis II (Specialization module, 6 CP, A)

Specialization module, 9 CP

• Applied Functional Analysis (Specialization module, 9 CP, A)
• Approximation Theory (Specialization module, 9 CP, A)
• Mathematical Statistics (Specialization module, 9 CP, A)
• Nonlinear Optimization (Specialization module, 9 CP, A)
• Numerical Solution Methods for Differential Equations (Specialization module, 9 CP, A)
• Numerical Solution Methods for Finite Dimensional Problems (Specialization module, 9 CP, A)
• Partial Differential Equations (Specialization module, 9 CP, R)
• Probability Theory (Specialization module, 9 CP, A)
• Specialization Module Numerical Mathematics/Optimization (9 ECTS) (Specialization module, 9 CP, A)
• Specialization Module Optimization (9 ECTS) (Specialization module, 9 CP, A)
• Specialization Module Stochastics (9 ECTS) (Specialization module, 9 CP, A)
• Stochastical Analysis (Specialization module, 9 CP, A)

Practical module, 6 CP

• Industrial Internship (Practical module, 6 CP)
• Internship Stochastics (Practical module, 6 CP)
• Mathematical Internship (Practical module, 6 CP)

Please note:

This page applies to the most current examination regulations in Winter semester 2016/17. If you are studying according to an earlier or later examination regulation other provisions may apply:

• Winter 2016/17
• Summer 2018 (no corresponding element)
• Winter 2018/19 (no corresponding element)
• Winter 2019/20 (no corresponding element)
• Winter 2020/21 (no corresponding element)
• Summer 2021 (no corresponding element)
• Winter 2021/22 (no corresponding element)
• Winter 2022/23 (no corresponding element)
• Winter 2023/24 (no corresponding element)

The information in this online module guide was created automatically. Legally binding is only the information in the examination regulations (Prüfungsordnung). If you notice any discrepancies or errors, we would be grateful for any advice.