Add to ORKGThis note is concerned with the numerical technique of operator splitting for initial value problems. Using a stiff linear ODE system as model problem, error bounds are derived for standard 1st- and 2nd-order splitting methods. The analysis focuses on deriving bounds independent of stiffness. The aim is to study the influence of stiffness on accuracy. Attention is paid to the influence of the splitting sequence on the splitting error and to the order reduction phenomenon
Abstract. The order of convergence for operator splitting applied to conservation laws with source t...
Abstract. In this paper we describe an iterative operator-splitting method for bounded operators. Th...
We consider quadrature formulas of high order in time based on Radau-type, L-stable implicit Runge-K...
This note is concerned with the numerical technique of operator splitting for initial value problems...
This note is concerned with the numerical technique of operator splitting for initial value problems...
International audienceOperator splitting methods are commonly used in many applications. We focus he...
Abstract. One way to solve complicated systems of differential equations is the application of opera...
In this paper we describe advanced operator-splitting methods for more accurate and exact decoupling...
AbstractThis paper reviews various aspects of stiffness in the numerical solution of initial-value p...
We consider stiff initial-value problems for second-order differential equations of the special form...
Splitting methods constitute a class (numerical) schemes for solving initial value problems. Roughly...
In this article, we combine operator-splitting methods of an iterative and non-iterative type to pro...
AbstractWe consider implicit integration methods for the numerical solution of stiff initial-value p...
The motivation for our studies is coming from simulation of earthquakes, that are modelled by elast...
Operator or time splitting is often used in the numerical solution of initial boundary value problem...
Abstract. The order of convergence for operator splitting applied to conservation laws with source t...
Abstract. In this paper we describe an iterative operator-splitting method for bounded operators. Th...
We consider quadrature formulas of high order in time based on Radau-type, L-stable implicit Runge-K...
This note is concerned with the numerical technique of operator splitting for initial value problems...
This note is concerned with the numerical technique of operator splitting for initial value problems...
International audienceOperator splitting methods are commonly used in many applications. We focus he...
Abstract. One way to solve complicated systems of differential equations is the application of opera...
In this paper we describe advanced operator-splitting methods for more accurate and exact decoupling...
AbstractThis paper reviews various aspects of stiffness in the numerical solution of initial-value p...
We consider stiff initial-value problems for second-order differential equations of the special form...
Splitting methods constitute a class (numerical) schemes for solving initial value problems. Roughly...
In this article, we combine operator-splitting methods of an iterative and non-iterative type to pro...
AbstractWe consider implicit integration methods for the numerical solution of stiff initial-value p...
The motivation for our studies is coming from simulation of earthquakes, that are modelled by elast...
Operator or time splitting is often used in the numerical solution of initial boundary value problem...
Abstract. The order of convergence for operator splitting applied to conservation laws with source t...
Abstract. In this paper we describe an iterative operator-splitting method for bounded operators. Th...
We consider quadrature formulas of high order in time based on Radau-type, L-stable implicit Runge-K...