INNOVATIVE INTEGRATORS
Workshop 2010
Innsbruck (Austria), October 27 - 30, 2010
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Talks
- Auzinger, Winfried: Exponential and rational multistep integrators
- Batkai, Andras: Operator splitting and non-autonomous evolution equations
- Beck, Steffen: Implicit peer two-step methods for large stiff ODE-systems
- Benderskaya, Galina: Numerical Time Integration in Low Frequency Computational Electromagnetics
- Bonaventura, Luca: Exponential Integrators for Problems with Multiple Time Scales in Environmental Fluid Dynamics
- Csomós, Petra: Numerical treatment of non-autonomous delay equations applying operator splitting
- Debrabant, Kristian: A micro/macro algorithm to accelerate Monte Carlo simulation of stochastic differential equations
- El-Azab, Tamer: Exponential peer methods
- Euler, Timo: Challenges in time integration for large-scale electromagnetic simulations
- Faou, Erwan: Backward error analysis for splitting methods applied to Hamiltonian PDEs
- Hochbruck, Marlis: Exponential multistep methods of Adams-type
- Horváth, Robert: Operator Splitting Methods for Non-Autonomous Systems and its Application to the Numerical Solution of the Maxwell Equations in Time-Varying Media
- Koch, Othmar: High-order Structure-Preserving Discretization Methods for Nonlinear Evolution Equations
- Kometa, Bawfeh Kingsley: Semi-Lagrangian multistep exponential integrators for index 2 differential algebraic systems
- Lubich, Christian: Symplectic Integration of Post-Newtonian Equations of Motion with Spin
- Maset, Stefano: Stability properties of exponential Runge-Kutta methods
- Mitkova, Teodora: High-Order Explicit Local Time Stepping forWave Propagation
- Neuhauser, Christof: Convergence of high-order time-splitting methods for nonlinear Schrödinger equations
- Rainer, Stefan: Meshfree exponential integrators
- Schratz, Katharina: Error analysis of Lie splitting methods for inhomogeneous evolution equations
- Tokman, Mayya: Construction and performance of up to fifth order Exponential Propagation Iterative Runge-Kutta-type (EPIRK) methods using B-series
- Weideman, J. Andre: Numerical Contour Integral Methods for Integrating Semi-Discrete Parabolic PDEs