Talks
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Talks 1 to 10 of 394 | show all
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| Date | Time | Venue | Talk |
|---|---|---|---|
| 07/11/19 | 04:00 pm | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
TBA* Sabine Le Borne, Technische Universität Hamburg, Institut für Mathematik, Lehrstuhl Numerische Mathematik, Am Schwarzenberg-Campus 3, Gebäude E, 21073 Hamburg TBA |
| 07/04/19 | 04:00 pm | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Analysis of the discretization error in the RBF-FD method Willi Leinen |
| 06/27/19 | 04:00 pm | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Inexakte iterative Projektionsverfahren für lineare und nichtlineare Eigenwertprobleme Nicolai Rehbein |
| 06/06/19 | 04:00 pm | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
TBA Sascha Trostorff, CAU Kiel, Arbeitsbereich Analysis, Ludewig-Meyn-Straße 4, 24098 Kiel TBA |
| 05/17/19 | 02:00 pm | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Radiale Basisfunktionen – ein Crashkurs Jens-Peter M. Zemke, Institut für Mathematik Radiale Basisfunktionen (RBF) dienen der Interpolation und Approximation mehrdimensionaler verteilter Daten. In diesem Vortrag werden RBF motiviert, die positive Definitheit und damit eindeutige Lösbarkeit einiger RBF hergeleitet, sowie Erweiterungen, wie bedingt definite RBF und flache RBF, vorgestellt. Der Fokus liegt hierbei auf den Beweistechniken und den Ideen hinter RBF. |
| 05/10/19 | 01:45 pm | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
TBA Fabian Gabel |
| 05/03/19 | 01:45 pm | H0.09 |
Mathematical basics of general relativity II Jan Meichsner, TUHH, Institut fuer Mathematik, Lehrstuhl fuer angewandte Analysis Part II of the presentation on general relativity. In this part we will talk about the basic equations and how physical quantities are described in terms of mathematical objects. |
| 04/26/19 | 01:45 pm | H0.07 |
Mathematical basics of general relativity I Jan Meichsner, TUHH, Institut fuer Mathematik, Lehrstuhl fuer angewandte Analysis I am not an expert on the field but during my studies I spent some time on understanding the mathematical basics of the general theory of relativity. I would present them in two parts. In the first part on the 26th of April I would concentrate on basics of differential geometry which are needed to describe the mathematics of the theory. In a second part on the 3rd of May I would explain how the before introduced structures are used to create a mathematical model of general relativity. |
| 04/25/19 | 11:00 am | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Kernschätzung bei Aggregationsproblemen mit radialen Basisfunktionen (Masterarbeit, TM) Torben Jentzsch |
| 04/24/19 | 04:00 pm | Am Schwarzenberg-Campus 3 (E), Room 3.074 |
A Riesz Decomposition Theorem for Schrödinger Operators on Graphs Florian Fischer, Universität Potsdam, Institut für Mathematik In the classical potential theory on the Euclidean space and in the potential theory of transient Markov chains a unique decomposition of superharmonic functions into a harmonic and a potential part is well-known. In this talk the basic concepts and ideas to gain such a decomposition for Schrödinger operators on graphs will be shown. The talk will show results of my master's thesis supervised by Matthias Keller. |
* Talk within the Colloquium on Applied Mathematics
