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| Winter Term 2022/23, Doctoral School Events | |
| 2022-10-21 | Doctoral School Seminar (10:30–13:00, TU, Seminarraum 2 Geometrie) |
| Stefan Hammer (TU, advisor W. Woess): Relations of Wiener Index and (Revised) Szeged Index on Cacti [show abstract] | |
| Mario Gobrial (TU, advisor O. Steinbach): A Space-Time Finite Element Method in Moving Domains [show abstract] | |
| Enis Chenchene (KFU, advisor K. Bredies): Graph and distributed extensions of the Douglas-Rachford method with applications [show abstract] | |
| Rosna Paul (TU, advisor O. Aichholzer): Compatible Spanning Trees in Simple Drawings [show abstract] | |
| 2022-11-18 | Doctoral School Seminar (10:30–13:00, TU, Seminarraum 2 Geometrie) |
| Hussain Shah (TU, advisor O. Steinbach): Existence and Uniqueness of the Solution of the Transport Equation [show abstract] | |
| Gabriel Lipnik (TU, advisor C. Elsholtz): A Central Limit Theorem for Integer Partitions into Small Powers [show abstract] | |
| Best Paper Award. New Students (TU/KFU): D. Strenger, J. Orthaber, B. Rago, M. Pompili, T. Schrotter | |
| Simon Pojer (TU, advisor S. Thonhauser): Asymptotic behaviour of ruin probabilities driven by a Markovian Hawkes process [show abstract] | |
| 2022-12-16 | Doctoral School Seminar (14:00–15:45, KFU, Seminarraum 11.32) |
| Alexandra Weinberger (TU, advisor O. Aichholzer): Simple drawings beyond the complete graph: Transformation and more [show abstract] | |
| Manuel Hauke (TU, advisor C. Aistleitner): The asymptotic behaviour of Sudler products [show abstract] | |
| Georg Stenzel (TU, advisor J. Behrndt): Schrödinger operators with a new type of singular interaction [show abstract] | |
| 2023-01-27 | Doctoral School Seminar (14:00–16:30, KFU) |
| Richard Löscher (TU, advisor O. Steinbach): Space-time adaptive simulation of the wave equation [show abstract] | |
| New Students (TU/KFU): N. Ayhan, A. Shtengel | |
| Christian Stelzer (TU, advisor J. Behrndt): Approximation of Dirac operators with singular potentials | |
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Abstract: Dirac operators are first order partial differential operators which are used in quantum mechanics to describe certain particles. Moreover, Dirac operators with singular (distributional) potentials are idealized models for particles which are influenced by strongly localized regular potentials. In this talk we are going to discuss an approximation scheme which serves as a mathematical justification for such idealized models. [hide abstract] |