Add to ORKGIn this technical note a general procedure is described to construct internally consistent splitting methods for the numerical solution of differential equations, starting from matching pairs of explicit and diagonally implicit Runge-Kutta methods. The procedure will be applied to suitable second-order pairs, and we will consider methods with or without a mass conserving finishing stage. For these splitting methods, the linear stability properties are studied and numerical test results are presented
Splitting methods constitute a class (numerical) schemes for solving initial value problems. Roughly...
AbstractThis paper is concerned with implicit Runge-Kutta methods for the numerical solution of init...
This centenary history of Runge-Kutta methods contains an appreciation of the early work of Runge, H...
Abstract. An important requirement of numerical me-thods for the integration of nonlinear sti ® init...
textabstractThis paper contains a convergence analysis for the method of Stabilizing Corrections, wh...
Improvements over embedded diagonally implicit Runge-Kutta pair of order four in five are presented....
A comprehensive linear stability analysis of splitting methods is carried out by means of a 2 × 2 ma...
We provide a comprehensive survey of splitting and composition methods for the numerical integratio...
Diagonally split Runge-Kutta (DSRK) time discretization methods are a class of implicit time-steppin...
An important requirement of numerical methods for the integration of nonlinear stiff initial value p...
Spectral deferred correction is a flexible technique for constructing high-order, stiffly-stable tim...
Different families of Runge–Kutta–Nyström (RKN) symplectic splitting methods of order 8 are presente...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
AbstractA pair of Runge-Kutta methods is applied to a system of ordinary differential equations in a...
In this paper we discuss implicit methods based on stiffly accurate Runge-Kutta methods and splittin...
Splitting methods constitute a class (numerical) schemes for solving initial value problems. Roughly...
AbstractThis paper is concerned with implicit Runge-Kutta methods for the numerical solution of init...
This centenary history of Runge-Kutta methods contains an appreciation of the early work of Runge, H...
Abstract. An important requirement of numerical me-thods for the integration of nonlinear sti ® init...
textabstractThis paper contains a convergence analysis for the method of Stabilizing Corrections, wh...
Improvements over embedded diagonally implicit Runge-Kutta pair of order four in five are presented....
A comprehensive linear stability analysis of splitting methods is carried out by means of a 2 × 2 ma...
We provide a comprehensive survey of splitting and composition methods for the numerical integratio...
Diagonally split Runge-Kutta (DSRK) time discretization methods are a class of implicit time-steppin...
An important requirement of numerical methods for the integration of nonlinear stiff initial value p...
Spectral deferred correction is a flexible technique for constructing high-order, stiffly-stable tim...
Different families of Runge–Kutta–Nyström (RKN) symplectic splitting methods of order 8 are presente...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
AbstractA pair of Runge-Kutta methods is applied to a system of ordinary differential equations in a...
In this paper we discuss implicit methods based on stiffly accurate Runge-Kutta methods and splittin...
Splitting methods constitute a class (numerical) schemes for solving initial value problems. Roughly...
AbstractThis paper is concerned with implicit Runge-Kutta methods for the numerical solution of init...
This centenary history of Runge-Kutta methods contains an appreciation of the early work of Runge, H...