Research
In our research, we focus on the numerical solution of linear algebraic problems, especially large linear systems of equations and eigenvalue problems. We also investigate the theory and numerics of matrix functions, as well as numerical topics in complex analysis, such as the computation of conformal mappings.
Details on research, publications and project involvements can be found on the pages of the respective group members.
Completed dissertations in the research group
| Name | Title | Year |
|---|---|---|
| Jan Zur | On the zeros of harmonic mappings: analysis, computation and application | 2022 |
| Carlos Echeverría Serur | Iterative solution of discretized convection-diffusion problems | 2020 |
| Olivier Sète | On interpolation and approximation problems in numerical linear algebra | 2016 |
| Robert Luce | From linear algebraic systems to elimination graphs and harmonic functions | 2014 |
| André Gaul | Recycling Krylov subspace methods for sequences of linear systems. Analysis and applications | 2014 |