Add to ORKGWe consider the construction of a class of numerical methods based on the general matrix inverse [14] which provides continuous interpolant for dense approximations (output). Their stability properties are similar to those for Runge-Kutta methods. These methods provide a unifying scope for many families of traditional methods. They are self-starting, to change stepsize during integration is not difficult when using them. We exploited these properties by first obtaining the direct block methods associated with the continuous schemes and then converting the block methods into uniformly A-stable high order general linear methods that are acceptable for solving stiff initial value problems. However, we will limit our formulation only for the st...
AbstractA number of questions and results concerning Runge-Kutta and general linear methods are surv...
A New implicit general linear method is designed for the numerical olution of stiff differential Equ...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
In this talk we describe the construction of highly stable general linear methods (GLMs) for the num...
We describe the construction of general linear methods in Nordsieck form of order p and stage order ...
AbstractThe solution of initial value problems in ordinary differential equations are continuously d...
Abstract. We suggest a general method for the construction of highly continuous interpolants for one...
AbstractGeneral linear methods were originally introduced to provide a unified theory of consistency...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
We investigate algebraic stability of two-step Runge-Kutta (TSRK) methods and of the new class of tw...
AbstractSarafyan's continuous method for approximate solution of initial value problems is extended ...
Aim of this paper is to begin an investigation on the linear stability analysis of a class of Genera...
The present paper develops a theory of multistep natural continuous extensions of Runge-Kutta method...
We investigate algebraic stability of two-step Runge-Kutta methods [2] for ordinary differential equ...
AbstractA number of questions and results concerning Runge-Kutta and general linear methods are surv...
A New implicit general linear method is designed for the numerical olution of stiff differential Equ...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
In this talk we describe the construction of highly stable general linear methods (GLMs) for the num...
We describe the construction of general linear methods in Nordsieck form of order p and stage order ...
AbstractThe solution of initial value problems in ordinary differential equations are continuously d...
Abstract. We suggest a general method for the construction of highly continuous interpolants for one...
AbstractGeneral linear methods were originally introduced to provide a unified theory of consistency...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
We investigate algebraic stability of two-step Runge-Kutta (TSRK) methods and of the new class of tw...
AbstractSarafyan's continuous method for approximate solution of initial value problems is extended ...
Aim of this paper is to begin an investigation on the linear stability analysis of a class of Genera...
The present paper develops a theory of multistep natural continuous extensions of Runge-Kutta method...
We investigate algebraic stability of two-step Runge-Kutta methods [2] for ordinary differential equ...
AbstractA number of questions and results concerning Runge-Kutta and general linear methods are surv...
A New implicit general linear method is designed for the numerical olution of stiff differential Equ...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...