AbstractWe examine a single-step implicit-integration algorithm which is obtained by a modification of the well-known trapezoidal rule. The obtained new method is a third-order numerical process and preserves the property of A-stability of the trapezoidal rule. Numerical examples involving stiff linear systems of first-order differential equations are also included to demonstrate the practical usefulness of this new integration procedure
The class of implicit-explicit (IMEX) methods are numerical scheme designed for numerical solution o...
Dynamical systems can often be decomposed into loosely coupled subsystems. The system of ordinary di...
This report presents an efficient and accurate method for integrating a system of ordinary different...
AbstractWe examine a single-step implicit-integration algorithm which is obtained by a modification ...
Review of implicit methods of integrating system of stiff ordinary differential equations is present...
The general principle of the trapezoidal rule of numerical integration is given. A specific example...
We develop self-starting family of three and five step continuous extended trapezoidal rule of secon...
Graduation date: 1963The thesis discusses stability of procedures based on linear\ud computing formu...
Systems of ordinary differential equations in which the magnitudes of the eigenvalues (or time const...
Examples and a criterion for stability of integration methods is provided. The criterion is applied ...
New methods for integrating systems of stiff, nonlinear, first order, ordinary differential equation...
AbstractThe author proposes some stable and convergent two-point integration formulae which are part...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
In this paper we examine the linear stability properties of singly-implicit general linear methods. ...
Two-step symmetrizers for the implicit midpoint and trapezoidal rules provide an alternative to the ...
The class of implicit-explicit (IMEX) methods are numerical scheme designed for numerical solution o...
Dynamical systems can often be decomposed into loosely coupled subsystems. The system of ordinary di...
This report presents an efficient and accurate method for integrating a system of ordinary different...
AbstractWe examine a single-step implicit-integration algorithm which is obtained by a modification ...
Review of implicit methods of integrating system of stiff ordinary differential equations is present...
The general principle of the trapezoidal rule of numerical integration is given. A specific example...
We develop self-starting family of three and five step continuous extended trapezoidal rule of secon...
Graduation date: 1963The thesis discusses stability of procedures based on linear\ud computing formu...
Systems of ordinary differential equations in which the magnitudes of the eigenvalues (or time const...
Examples and a criterion for stability of integration methods is provided. The criterion is applied ...
New methods for integrating systems of stiff, nonlinear, first order, ordinary differential equation...
AbstractThe author proposes some stable and convergent two-point integration formulae which are part...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
In this paper we examine the linear stability properties of singly-implicit general linear methods. ...
Two-step symmetrizers for the implicit midpoint and trapezoidal rules provide an alternative to the ...
The class of implicit-explicit (IMEX) methods are numerical scheme designed for numerical solution o...
Dynamical systems can often be decomposed into loosely coupled subsystems. The system of ordinary di...
This report presents an efficient and accurate method for integrating a system of ordinary different...