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| Summer Term 2021, Doctoral School Events | |
| 2021-03-19 | Doctoral School Seminar (10:00–12:00, Video conference, TU) |
| Michael Missethan (TU, advisor M. Kang): Maximum degree in random planar graphs [show abstract] | |
| Daniel Windisch (TU, advisor S. Frisch): Prime ideals in infinite products of commutative rings [show abstract] | |
| New Students (TU+KFU) | |
| Benjamin Klahn (TU, advisor C. Elsholtz): A Divisor Problem for Polynomials [show abstract] | |
| 2021-04-23 | Doctoral School Seminar (14:00–16:30, Video conference, KFU) |
| Christian Lindorfer (TU, advisor W. Woess): Word problems for groups [show abstract] | |
| Panagiotis Spanos (TU, advisor W. Woess): Random walks and the Dirichlet problem at infinity [show abstract] | |
| New Students (TU+KFU) | |
| Aqsa Bashir (KFU, advisor A. Geroldinger): Stable Domains and their Arithmetic [show abstract] | |
| 2021-05-21 | Doctoral School Seminar (10:00–12:00, Video Conference, TU) |
| Julian Zalla (TU, advisor M. Kang): Loose cores and cycles in random hypergraphs [show abstract] | |
| Raphael Watschinger (TU, advisor G. Of): An integration by parts formula for the hypersingular boundary integral operator of the heat equation | |
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Abstract: The so-called hypersingular boundary integral operator is one of the operators which are encountered when studying the solution of PDEs via boundary integral equations. Its evaluation is in general difficult, because it involves singular integrals that do no exist in a classical sense. However, for many PDEs there exist formulas based on some sort of integration by parts, which allow us to overcome this problem when evaluating the bilinear form corresponding to the hypersingular operator. In this talk we consider such a formula for the heat equation. In particular, we look at the formula available in the literature, discuss why it is unsatisfactory and provide a suitable alternative.[hide abstract] | |
| New Students (TU+KFU) | |
| Richard Huber (KFU, advisor K. Bredies): Evolution of Critical Trajectories [show abstract] | |
| 2021-06-18 | Doctoral School Seminar (14:00–16:30, Video conference, KFU) |
| Josef Strini (TU, advisor S. Thonhauser): A time-inconsistent stochastic optimal control problem from risk theory [show abstract] | |
| Huan Chen (KFU, advisor G. Haase): Reinforcement learning based controller for hybrid electric vehicles [show abstract] | |
| Martin Schwinzerl (KFU, advisor G. Haase): Optimising The Numerical Performance and Scalability Of Beam Field Elements In Beam Dynamics Simulations [show abstract] | |
| Thomas Hirschler (TU, advisor W. Woess): Comparing Entropy Rates on Finite and Infinite Rooted Trees [show abstract] |