In this paper, we describe the construction of a class of methods with a large area of the stability region for solving Volterra integro-differential equations. In the structure of these methods which is based on a subclass of explicit general linear methods with and without Runge-Kutta stability property, we use an adequate quadrature rule to approximate the integral term of the equation. The free parameters of the methods are used to obtain methods with a large stability region. The efficiency of the proposed methods is verified with some numerical experiments and comparisons with other existing methods
In this paper we propose some implicit methods for stiff Volterra integral equations of second kind....
AbstractThe stability of the de Hoog and Weiss Runge-Kutta methods is analyzed for the Volterra inte...
The numerical stability of the polynomial spline collocation method for general Volterra integro-dif...
In this paper, we describe the construction of a class of methods with a large area of the stability...
Abstract. A new class of numerical methods for Volterra integro-differential equations with memory i...
A new class of numerical methods for Volterra integro-differential equations with memory is develope...
Abstract. A new class of numerical methods for Volterra integro-differential equations with memory i...
summary:Stability analysis for numerical solutions of Voltera integro-differential equations based o...
We investigate the class of general linear methods of order $p$ and stage order $q=p$ for the numeri...
Linear multistep methods for ordinary differential equations in conjunction with a family of computa...
A formal relationship between quadrature rules and linear multistep methods for ordinary differentia...
Linear multistep methods for ordinary differential equations generate convolution quadrature rules. ...
summary:Method for numerical solution of Volterra integral equations, based on the O.I.M. methods, i...
In this paper we propose some implicit methods for stiff Volterra integral equations of second kind....
AbstractThe stability of the de Hoog and Weiss Runge-Kutta methods is analyzed for the Volterra inte...
The numerical stability of the polynomial spline collocation method for general Volterra integro-dif...
In this paper, we describe the construction of a class of methods with a large area of the stability...
Abstract. A new class of numerical methods for Volterra integro-differential equations with memory i...
A new class of numerical methods for Volterra integro-differential equations with memory is develope...
Abstract. A new class of numerical methods for Volterra integro-differential equations with memory i...
summary:Stability analysis for numerical solutions of Voltera integro-differential equations based o...
We investigate the class of general linear methods of order $p$ and stage order $q=p$ for the numeri...
Linear multistep methods for ordinary differential equations in conjunction with a family of computa...
A formal relationship between quadrature rules and linear multistep methods for ordinary differentia...
Linear multistep methods for ordinary differential equations generate convolution quadrature rules. ...
summary:Method for numerical solution of Volterra integral equations, based on the O.I.M. methods, i...
In this paper we propose some implicit methods for stiff Volterra integral equations of second kind....
AbstractThe stability of the de Hoog and Weiss Runge-Kutta methods is analyzed for the Volterra inte...
The numerical stability of the polynomial spline collocation method for general Volterra integro-dif...