Efficient high-order time discretization methods for PDEs

Invited Speakers

- Raffaele D’Ambrosio, Università degli Studi dell’Aquila, Italy,
Adapted discretization of partial differential equations generating periodic wavefronts

- Giacomo Dimarco, Università degli Studi di Ferrara, Italy,
IMEX multistep method for hyperbolic systems with relaxation

- Nicola Guglielmi, Gran Sasso Science Institute, L'Aquila, Italy,
Numerical inverse Laplace transform for convection-diffusion equations

- Ernst Hairer, Université de Genève, Switzerland,
Numerical long-time conservation of energy, momentum and actions for nonlinear wave equations

- Inmaculada Higueras, Universidad Pública de Navarra, Pamplona, Spain,
Efficient Strong Stability Preserving IMEX Runge-Kutta methods

- Jingwei Hu, Purdue University, West Lafayette, IN, USA,
A second-order asymptotic-preserving and positivity-preserving exponential Runge-Kutta method for a class of stiff kinetic equations

- Zdzislaw Jackiewicz, Arizona State University, Tempe, AZ, USA,
Strong stability preserving implicit-explicit transformed general linear methods

- David Ketcheson, King Abdullah Univ. of Science and Technology, Saudi Arabia,
Relaxation Runge-Kutta methods: fully-discrete entropy-stability for hyperbolic PDEs

- Pep Mulet, Universitat de València, Spain,
Implicit-explicit schemes for PDE with convection and degenerate diffusion

- Alexander Ostermann, University of Innsbruck, Austria,
A low-regularity Fourier integrator for the cubic nonlinear Schrödinger equation

- Jingmei Qiu, University of Delaware, Newark, DE, USA,
Semi-Lagrangian Discontinuous Galerkin Methods for Fluid and Kinetic Applications

- Giovanni Samaey, KU Leuven (University of Leuven), Belgium,
Projective and telescopic projective integration for the nonlinear BGK and Boltzmann equations

- Adrian Sandu, Virginia Tech, Blacksburg, VA, USA,
New developments in multirate integration

- Chi-Whang Shu, Brown University, Providence, RI, USA.
Strong stability of explicit Runge-Kutta time discretizations for semi-negative linear systems