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| Summer Term 2014, Doctoral School Events | |
| 2014-03-14 | Doctoral School Seminar (Seminarraum 2 des Instituts für Geometrie, Kopernikusgasse 24, CANCELLED) |
| 2014-04-11 | Doctoral School Seminar (Inst. Mathematik, Heinrichstr. 36., Seminarraum 11.32, 13:15—15:45, KFU) |
| Martin Piffl (TU, advisor E. Stadlober): Efficient Treatment of High Dimensional Computer Experiments [show abstract] | |
| Tang Quoc Bao (KFU, advisor K. Fellner): A reaction diffusion system modelling asymmetric stem cells division: existence and quasi-steady-state approximation [show abstract] | |
| Maria Rita Iaco (TU, advisor R. Tichy): Optimal Bounds for Integrals with Respect to Copulas and Applications [show abstract] | |
| Rohmatul Fajriyah (TU, advisor I. Berkes): Background correction of the Illumina BeadArrays [show abstract] | |
| 2014-05-23 | Doctoral School Seminar (Inst. Mathematik, Heinrichstr. 36, Seminarraum 11.32, 13:00—15:30, KFU) |
| Thomas Mendlik (TU, advisor E. Stadlober): Quantification of climate change using a multilevel regression model [show abstract] | |
| Eva Siegmann (KFU, advisor G. Haase): DEM-CFD simulations of polyhedral shaped particles [show abstract] | |
| Maria Rita Iaco (TU, advisor R. Tichy): Ergodic properties of β-adic Halton sequences [show abstract] | |
| Stefan Waldenberger (TU, advisor W. Müller): Affine LIBOR models driven by real-valued affine processes [show abstract] | |
| 2014-06-27 | Doctoral School Seminar (Seminarraum 2 des Instituts für Geometrie, Kopernikusgasse 24, 10:30—13:00, TU) |
| Behzad Azmi (KFU, advisor K. Kunisch): A receding horizon framework for the stabilization of controlled systems | |
|
Abstract: One efficient strategy for dealing with optimal control problems on an infinite time horizon is the receding horizon framework. In this approach, an infinite horizon optimal control problem is approximated by a sequence of finite horizon problems in a receding horizon fashion. However, stability (convergence to steady state) is not generally ensured due to the use of a finite prediction horizon. Thus, an additional terminal cost function is often needed to ensure asymptotic stability. In this presentation, we are concerned with the receding horizon approach for infinite-dimensional dynamical systems. we study the stabilizing property of the receding horizon framework for different choices of the terminal cost. Numerical examples are presented as well.[hide abstract] | |
| Renier Mendoza (KFU, advisor S. Keeling): A Multi-Phase Segmentation Approach to Electrical Impedance Tomography [show abstract] | |
| Christoph Koch (TU, advisor M. Kang): The phase transition of the largest component in random graphs and hypergraphs [show abstract] | |
| Bumrungsak Phuenaree (KFU, advisor F. Kappel): Nonlinear Maximum Likelihood Problems with Non-normal Data [show abstract] |