| 07/16/26 |
10:00 am |
Am Schwarzenberg-Campus 3 (E), Room 3.046 |
Bachelorarbeit: Ein Vergleich von WENO und "Neural Operators" für die 1D Burgers Gleichung Elnur Mikailov |
| 07/15/26 |
12:00 pm |
Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Bachelorarbeit: Quantifizierung von Unsicherheit in Modellen von Klebestreifen Hannes Neumann |
| 07/13/26 |
10:00 am |
Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Gaussian Process Regression with Physics-informed Kernels [MSc thesis] Monir Sharifi |
| 07/08/26 |
11:00 am |
Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Finding the roots of polynomials: An approach based on Newton’s method (Bachelorarbeit) Felix Frenzel |
| 06/25/26 |
03:00 pm |
Am Schwarzenberg-Campus 3 (E), Room 3.074 and Zoom |
L^p boundedness of the Riesz transform associated with elliptic Operators Tobias Schmale, TUHHGiven an elliptic operator L=-divA∇ on L^2(R^n) one has by the Kato square root property that dom L^½=H^1(R^n) and
c||∇f||_2 ≤ ||L^½f||_2 ≤ C||∇f||_2
for some c,C>0 and f∈H^1(R^n). The right inequality above beeing equivalent to the Riesz transform ∇L^(-½) being bounded on L^2(R^n). The subject of the talk will be for what other p-norms the above inequality, specifically boundedness of the Riesz transform holds. It turns out that they are essentially the same p as for which the semigroup generated by -L is bounded on L^p(R^n). Zoomlink: https://tuhh.zoom.us/j/83250070589?pwd=UZ52e5cgqaexuY9SnleyZo01MmukYW.1 |
| 06/25/26 |
10:00 am |
Am Schwarzenberg-Campus 3 (E), Room 3.061 |
Failure forecasting and service response analysis for medical devices Suraj Sathyanarayanan |
| 06/23/26 |
10:00 am |
Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Bachelorarbeit: Entwicklung eines Physikinformierten Neuronalen Netzes und Operators zur Vorhersage von Spontanatmung zur Integration in einem 1oo2D System für ein Anästhesiesystem Thies Paap |
| 06/22/26 |
10:00 am |
Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Bachelorarbeit: Nutzung neuronaler Netze zum Ersatz nichtlinearer Lösungsverfahren für implizite Zeitintegration mit WENO-Raumdiskretisierung Jorgos Drossinakis |
| 06/18/26 |
04:00 pm |
Am Schwarzenberg-Campus 3 (E), Room 3.074 |
Homogenization of the Biharmonic Equation Andreas Buchinger, TU HamburgIn this talk, we will discuss a very recent operator-theoretic result concerning second-order elliptic equations that yields a compactness theorem in the homogenization theory of the biharmonic equation, i.e., a fourth-order problem. |
| 06/18/26 |
03:00 pm |
Am Schwarzenberg-Campus 3 (E), Room 3.074 and Zoom |
The bounded transform approach to functional calculus of self-adjoint operators Christian Budde, University of the Free State, Bloemfontein, South AfricaSpectral theory and functional calculus for unbounded self-adjoint operators on a Hilbert space are usually treated through von Neumann’s Cayley transform. Using ideas of Woronowicz, we redevelop this theory from the point of view of multiplier algebras and the so-called bounded transform (which establishes a bijective correspondence between closed operators and pure contractions). This also leads to a simple account of the affiliation relation between von Neumann algebras and self-adjoint operators. This is joint work with K. Landsman (Nijmegen, Netherlands). Zoomlink: https://tuhh.zoom.us/j/81617046707?pwd=tTkia9CCoCuaiEaEsrCmTqlMr1cfOT.1 |