In this article, we derive fast and robust preconditioned iterative methods for the all-at-once linear systems arising upon discretization of time-dependent PDEs. The discretization we employ is based on a Runge--Kutta method in time, for which the development of robust solvers is an emerging research area in the literature of numerical methods for time-dependent PDEs. By making use of classical theory of block matrices, one is able to derive a preconditioner for the systems considered. An approximate inverse of the preconditioner so derived consists in a fixed number of linear solves for the system of the stages of the method. We thus propose a preconditioner for the latter system based on a singular value decomposition (SVD) of t...
The last decades have seen a strongly increasing use of computers for modeling larger and more compl...
The ability to discretize and solve time-dependent Ordinary Differential Equations (ODEs) and Partia...
Most research on preconditioners for time-dependent PDEs has focused on implicit multi-step or diago...
The main difficulty in the implementation of most standard implicit Runge-Kutta (IRK) methods applie...
In this thesis, we examine the solution to a range of time-dependent Partial Differential Equation (...
AbstractThe main difficulty in the implementation of most standard implicit Runge–Kutta (IRK) method...
Standard Krylov subspace solvers for self-adjoint problems have rigorous convergence bounds based so...
McDonald, Pestana, and Wathen [SIAM J. Sci. Comput., 40 (2018), pp. A1012–A1033] present a method fo...
textabstractThis paper deals with solving stiff systems of differential equations by implicit Multis...
Fully implicit Runge–Kutta methods offer the possibility to use high order accurate time discretizat...
AbstractFrom a theoretical point of view, Runge-Kutta methods of collocation type belong to the most...
A major problem in obtaining an e#cient implementation of fully implicit RungeKutta (IRK) methods ap...
AbstractFor the numerical integration of a stiff ordinary differential equation, fully implicit Rung...
AbstractGalerkin fully discrete approximations for hyperbolic equations with time-dependent coeffici...
In this thesis, the design of the preconditioners we propose starts from applications instead of tre...
The last decades have seen a strongly increasing use of computers for modeling larger and more compl...
The ability to discretize and solve time-dependent Ordinary Differential Equations (ODEs) and Partia...
Most research on preconditioners for time-dependent PDEs has focused on implicit multi-step or diago...
The main difficulty in the implementation of most standard implicit Runge-Kutta (IRK) methods applie...
In this thesis, we examine the solution to a range of time-dependent Partial Differential Equation (...
AbstractThe main difficulty in the implementation of most standard implicit Runge–Kutta (IRK) method...
Standard Krylov subspace solvers for self-adjoint problems have rigorous convergence bounds based so...
McDonald, Pestana, and Wathen [SIAM J. Sci. Comput., 40 (2018), pp. A1012–A1033] present a method fo...
textabstractThis paper deals with solving stiff systems of differential equations by implicit Multis...
Fully implicit Runge–Kutta methods offer the possibility to use high order accurate time discretizat...
AbstractFrom a theoretical point of view, Runge-Kutta methods of collocation type belong to the most...
A major problem in obtaining an e#cient implementation of fully implicit RungeKutta (IRK) methods ap...
AbstractFor the numerical integration of a stiff ordinary differential equation, fully implicit Rung...
AbstractGalerkin fully discrete approximations for hyperbolic equations with time-dependent coeffici...
In this thesis, the design of the preconditioners we propose starts from applications instead of tre...
The last decades have seen a strongly increasing use of computers for modeling larger and more compl...
The ability to discretize and solve time-dependent Ordinary Differential Equations (ODEs) and Partia...
Most research on preconditioners for time-dependent PDEs has focused on implicit multi-step or diago...