Abstract. Implicit integration schemes for ODEs, such as Runge-Kutta and Runge-Kutta-Nyström methods, are widely used in mathematics and engi-neering to numerically solve ordinary differential equations. Every integration method requires one to choose a step-size, h, for the integration. If h is too large or too small the efficiency of an implicit scheme is relatively low. As every implicit integration scheme has a global error inherent to the scheme, we choose the total number of computations in order to achieve a prescribed global error as a measure of efficiency of the integration scheme. In this paper, we propose the idea of choosing h by minimizing an efficiency function for general Runge-Kutta and Runge-Kutta-Nyström integration rou...
Abstract: In this paper, we have obtained the step size strategies for numerical integration of the ...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...
A scheme is developed for the automatic selection of the initial step size for an ODE solver. Additi...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
In this paper, a direct integration implicit variable step size method in the form of Adams Moulton ...
A class of variable order/variable step diagonally implicit Runge-Kutta formulae suitable for the nu...
For effcient integration of such kind of systems we consider implicit-explicit (IMEX) methods, where...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
AbstractThe choice of initial step size is critical for the reliable numerical solution of the initi...
In this study, a variable step size approach is adopted in implementing Implicit Block Multi-step M...
AbstractThe use of implicit methods for ODEs, e.g. implicit Runge-Kutta schemes, requires the soluti...
We present an algorithm for determining the stepsize in an explicit Runge-Kutta method that is suita...
We introduce a variable step size algorithm for the pathwise numerical approximation of solutions to...
AbstractWe introduce a variable step size algorithm for the pathwise numerical approximation of solu...
Abstract: In this paper, we have obtained the step size strategies for numerical integration of the ...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...
A scheme is developed for the automatic selection of the initial step size for an ODE solver. Additi...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
In this paper, a direct integration implicit variable step size method in the form of Adams Moulton ...
A class of variable order/variable step diagonally implicit Runge-Kutta formulae suitable for the nu...
For effcient integration of such kind of systems we consider implicit-explicit (IMEX) methods, where...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
AbstractThe choice of initial step size is critical for the reliable numerical solution of the initi...
In this study, a variable step size approach is adopted in implementing Implicit Block Multi-step M...
AbstractThe use of implicit methods for ODEs, e.g. implicit Runge-Kutta schemes, requires the soluti...
We present an algorithm for determining the stepsize in an explicit Runge-Kutta method that is suita...
We introduce a variable step size algorithm for the pathwise numerical approximation of solutions to...
AbstractWe introduce a variable step size algorithm for the pathwise numerical approximation of solu...
Abstract: In this paper, we have obtained the step size strategies for numerical integration of the ...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...
A scheme is developed for the automatic selection of the initial step size for an ODE solver. Additi...