Add to ORKGhtmlabstractWe present modifications of the second-order Douglas stabilizing corrections method, which is a splitting method based on the implicit trapezoidal rule. Inclusion of an explicit term in a forward Euler way is straightforward, but this will lower the order of convergence. In the modifications considered here, explicit terms are included in a second-order fashion. For these modified methods, results on linear stability and convergence are derived. Stability holds for important classes of reaction-diffusion equations, and for such problems the modified Douglas methods are seen to be often more efficient than related methods from the literature
Spectral deferred correction is a flexible technique for constructing high-order, stiffly-stable tim...
An efficient higher-order finite difference algorithm is presented in this article for solving syste...
We present a splitting moving mesh method for multi-dimensional reaction-diffusion problems with non...
We present modifications of the second-order Douglas stabilizing corrections method, which is a spli...
In this note some stability results are derived for the Douglas splitting method. The relevance of t...
textabstractThis paper contains a convergence analysis for the method of Stabilizing Corrections, wh...
In this technical note a general procedure is described to construct internally consistent splittin...
An initial-value problem consists of an ordinary differential equation subject to an initial conditi...
International audienceWe show that the Strang splitting method applied to a diffusion-reaction equat...
The convergence and stability analysis of a simple explicit finite difference method is studied in t...
The Strang splitting method, formally of order two, can suffer from order reduction when applied to ...
Contributed in honor of Fred Wan on the occasion of his 70th birthday Abstract. In a previous study ...
In stiff reaction-diffusion equations, whiles explicit time discretization schemes are utilized, the...
Splitting methods constitute a class (numerical) schemes for solving initial value problems. Roughly...
The most popular numerical method for solving systems of reaction-diffusion equations continues to b...
Spectral deferred correction is a flexible technique for constructing high-order, stiffly-stable tim...
An efficient higher-order finite difference algorithm is presented in this article for solving syste...
We present a splitting moving mesh method for multi-dimensional reaction-diffusion problems with non...
We present modifications of the second-order Douglas stabilizing corrections method, which is a spli...
In this note some stability results are derived for the Douglas splitting method. The relevance of t...
textabstractThis paper contains a convergence analysis for the method of Stabilizing Corrections, wh...
In this technical note a general procedure is described to construct internally consistent splittin...
An initial-value problem consists of an ordinary differential equation subject to an initial conditi...
International audienceWe show that the Strang splitting method applied to a diffusion-reaction equat...
The convergence and stability analysis of a simple explicit finite difference method is studied in t...
The Strang splitting method, formally of order two, can suffer from order reduction when applied to ...
Contributed in honor of Fred Wan on the occasion of his 70th birthday Abstract. In a previous study ...
In stiff reaction-diffusion equations, whiles explicit time discretization schemes are utilized, the...
Splitting methods constitute a class (numerical) schemes for solving initial value problems. Roughly...
The most popular numerical method for solving systems of reaction-diffusion equations continues to b...
Spectral deferred correction is a flexible technique for constructing high-order, stiffly-stable tim...
An efficient higher-order finite difference algorithm is presented in this article for solving syste...
We present a splitting moving mesh method for multi-dimensional reaction-diffusion problems with non...