AbstractIn this paper, a general and detailed study of linear stability of Runge–Kutta–Nyström (RKN) methods is given. In the case that arbitrarily stiff problems are integrated, we establish a condition that RKN methods must satisfy so that a uniform bound for stability can be achieved. This condition is not satisfied by any method in the literature. Therefore, a stable method is constructed and some numerical comparisons are made
An algorithm is developed to determine coefficients of the stability polynomials such that the expli...
Aim of this paper is to begin an investigation on the linear stability analysis of a class of Genera...
Stabilized Runge???Kutta methods are especially efficient for the numerical solution of large system...
AbstractIn this paper, a general and detailed study of linear stability of Runge–Kutta–Nyström (RKN)...
AbstractThe classical theory of stability of explicit Runge—Kutta methods is concerned with Lipschit...
AbstractThis paper is concerned with the stability of rational two-stage Runge Kutta methods for the...
. In the solution of stiff ODEs and especially DAEs it is desirable that the method used is stiffly...
We review and extend the list of stability and convergence properties satisfied by Runge-Kutta (RK) ...
We review and extend the list of stability and convergence properties satisfied by Runge-Kutta (RK) ...
AbstractThis paper is concerned with the stability analysis of the Runge–Kutta methods for the equat...
AbstractThis paper provides an investigation of the stability properties of a family of exponentiall...
The parametric instability arising when ordinary differential equations (ODEs) are numerically integ...
The parametric instability arising when ordinary differential equations (ODEs) are numerically integ...
The parametric instability arising when ordinary differential equations (ODEs) are numerically integ...
In this paper we study conditional stability properties of exponential Runge\u2013Kutta methods when...
An algorithm is developed to determine coefficients of the stability polynomials such that the expli...
Aim of this paper is to begin an investigation on the linear stability analysis of a class of Genera...
Stabilized Runge???Kutta methods are especially efficient for the numerical solution of large system...
AbstractIn this paper, a general and detailed study of linear stability of Runge–Kutta–Nyström (RKN)...
AbstractThe classical theory of stability of explicit Runge—Kutta methods is concerned with Lipschit...
AbstractThis paper is concerned with the stability of rational two-stage Runge Kutta methods for the...
. In the solution of stiff ODEs and especially DAEs it is desirable that the method used is stiffly...
We review and extend the list of stability and convergence properties satisfied by Runge-Kutta (RK) ...
We review and extend the list of stability and convergence properties satisfied by Runge-Kutta (RK) ...
AbstractThis paper is concerned with the stability analysis of the Runge–Kutta methods for the equat...
AbstractThis paper provides an investigation of the stability properties of a family of exponentiall...
The parametric instability arising when ordinary differential equations (ODEs) are numerically integ...
The parametric instability arising when ordinary differential equations (ODEs) are numerically integ...
The parametric instability arising when ordinary differential equations (ODEs) are numerically integ...
In this paper we study conditional stability properties of exponential Runge\u2013Kutta methods when...
An algorithm is developed to determine coefficients of the stability polynomials such that the expli...
Aim of this paper is to begin an investigation on the linear stability analysis of a class of Genera...
Stabilized Runge???Kutta methods are especially efficient for the numerical solution of large system...
DOI
Add to ORKG