Add to ORKGIn this paper we define unconditional stability properties of exponential Runge-Kutta methods when they are applied to semi-linear systems of ordinary differential equations characterized by a stiff linear part and a nonstiff non-linear part. These properties are related to a class of systems and to a specific norm. We give sufficient conditions in order that an explicit method satisfies such properties. On the basis of such conditions we analyze some of the popular methods
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
In this paper we study conditional stability properties of exponential Runge\u2013Kutta methods when...
There are three interesting properties of methods for (stiff) ordinary differential equations: order...
AbstractThis paper is concerned with the stability of rational two-stage Runge Kutta methods for the...
AbstractThe classical theory of stability of explicit Runge—Kutta methods is concerned with Lipschit...
A number of important applied problems of chemical kinetics, biophysics, theory of electrical circui...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
AbstractA function characterizing the stability of explicit boundary value Runge-Kutta methods for t...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
In this paper we study conditional stability properties of exponential Runge\u2013Kutta methods when...
There are three interesting properties of methods for (stiff) ordinary differential equations: order...
AbstractThis paper is concerned with the stability of rational two-stage Runge Kutta methods for the...
AbstractThe classical theory of stability of explicit Runge—Kutta methods is concerned with Lipschit...
A number of important applied problems of chemical kinetics, biophysics, theory of electrical circui...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
We describe the derivation of highly stable general linear methods for the numerical solution of ini...
AbstractA function characterizing the stability of explicit boundary value Runge-Kutta methods for t...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
Abstract—We describe the derivation of highly stable general linear methods for the numerical soluti...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...