The following list shows the courses that took place in the summer semester 2009:

1. Differential geometry, global analysis, and topology
- Differential Geometry: B. Smith, FU

2. Algebra and number theory, algebraic and arithmetic geometry
- Algebraic Geometry: A. Schmitt, FU

3. Probability theory and financial mathematics
- Stochastic processes II: Continous time: J. Blath, TU

4. Discrete mathematics and discrete geometry
- Combinatorics: S. Felsner , TU

5. Linear, nonlinear, and combinatorial optimization
- Nonlinear optimization: M. Hintermüller, HU

6. Numerical analysis, scientific computing, and visualization
- Numerical methods for PDEs: P. Deuflhard, FU

7. Applied analysis, mathematical physics, and dynamical systems
- Partial Differential Equations: A. Mielke, HU  

* Additional courses:
- Complex analysis: D. Werner, FU
- Functional analysis: P. Wittbold, TU

The following list shows the courses that took place in the winter semester 2008/09:

1. Differential geometry, global analysis, and topology
    - Analysis and Geometry on manifolds: K. Ecker, FU
2. Algebra and number theory, algebraic and arithmetic geometry
    - Commutative Algebra: A. Schmitt, FU
3. Probability theory and financial mathematics
    - Stochastic processes I: Discrete time: J. Blath, TU
4. Discrete mathematics and discrete geometry
    - Geometry: A. Bobenko, TU 
5. Linear, nonlinear, and combinatorial optimization
    - Linear and integer programming: R. Möhring, TU
6. Numerical analysis, scientific computing, and visualization
    - Numerical methods for ODEs and numerical linear algebra: R. Klein, FU
7. Applied analysis, mathematical physics, and dynamical systems
    - Dynamical Systems: E. Kirchberg, HU
  * Additional courses:
    - Functional analysis: J. Naumann, HU
    - Topology: C. Schultz, TU
 

The following list shows in red the courses that took place in the summer semester 2008:

1. Differential geometry, global analysis, and topology
    - Differential Geometry: D. Schüth, HU
    - Differential Geometry: Surface Theory: U. Pinkall, TU
2. Algebra and number theory, algebraic and arithmetic geometry
    - Algebraic Geometry: G. Farkas, HU
3. Probability theory and financial mathematics
    - Stochastic processes II: Continous time: U. Küchler, HU
4. Discrete mathematics and discrete geometry
    - Combinatorics: M. Aigner, FU
5. Linear, nonlinear, and combinatorial optimization
    - Nonlinear optimization: A. Griewank, HU
6. Numerical analysis, scientific computing, and visualization
     - Numerical methods for PDEs: R. Kornhuber, FU
7. Applied analysis, mathematical physics, and dynamical systems
    - Partial Differential Equations: J. Sprekels, HU  
* Additional courses:
    - Complex analysis: D. Ferus, TU
    - Functional analysis: J. Behrndt, TU
    - Differential Geometry: K. Polthier, FU

The following list shows in red the courses that took place in the winter semester 2007/08:

1. Differential geometry, global analysis, and topology
    - Analysis and geometry on manifolds: D. Schüth, HU
2. Algebra and number theory, algebraic and arithmetic geometry
    - Commutative algebra: J. Kramer, HU
3. Probability theory and financial mathematics
    - Stochastic processes I: Discrete time: U. Küchler, HU  
4. Discrete mathematics and discrete geometry
    - Geometry: B. Springborn, TU
5. Linear, nonlinear, and combinatorial optimization
    - Linear and integer programming: M. Skutella, TU
6. Numerical analysis, scientific computing, and visualization
    - Numerical methods for ODEs and numerical linear algebra: R. Kornhuber, FU
7. Applied analysis, mathematical physics, and dynamical systems
    - Partial differential equations: K. Ecker, FU

* Additional courses:
    - Complex analysis: W. Gubler, HU
    - Functional analysis: J. Sprekels, HU
    - Topology: G. M. Ziegler, TU
    - Differential geometry I: Konrad Polthier, FU

1. Differential geometry, global analysis, and topology
    - Surface theory K. Mohnke, HU
2. Algebra and number theory, algebraic and arithmetic geometry
    - Algebraic geometry: K. Altmann, FU
3. Probability theory and financial mathematics
    - Stochastic processes II: Continuous time: A. Bovier, TU
4. Discrete mathematics and discrete geometry
    - Combinatorics: G. M. Ziegler, TU
5. Linear, nonlinear, and combinatorial optimization
    - Nonlinear optimization: B. Kummer, HU
6. Numerical analysis, scientific computing, and visualization
    - Numerical methods for PDEs: R. Klein, FU
7. Applied analysis, mathematical physics, and dynamical systems
    - Dynamical systems: B. Fiedler, FU
* Additional courses:
    - Functional analysis: H. Winkler, TU

1. Differential geometry, global analysis, and topology
    - Analysis and geometry on manifolds: K. Mohnke, HU
2. Algebra and number theory, algebraic and arithmetic geometry
    - Commutative algebra: K. Altmann, FU
3. Probability theory and financial mathematics
    - Stochastic processes I: Discrete time: A. Bovier, TU
4. Discrete mathematics and discrete geometry
    - Geometry: A. Bobenko, TU
5. Linear, nonlinear, and combinatorial optimization
    - Linear and integer programming: M. Grötschel, TU
6. Numerical analysis, scientific computing, and visualization
    - methods for ODEs and numerical linear algebra: R. Klein, FU
7. Applied analysis, mathematical physics, and dynamical systems
    - Partial differential equations: J. Naumann, HU
* Additional courses:
    - Complex analysis: J. Leiterer, HU
    - Topology: J. M. Sullivan, TU