AbstractIt is well known that the application of one-step or linear multistep methods to an ordinary differential equation with first integrals will destroy the conserving quantities. With the use of stabilization techniques similar to Ascher, Chin, Reich (Numer. Math. 67 (1997) 131–149) we derive stabilized variants of our original problem. We show that variable step size one-step and linear multistep methods applied to the stabilized equation will reproduce that phase portrait correctly. In particular, this technique will conserve first integrals over an infinite time interval within the local error of the used method
AbstractIn [1], a set of convergent and stable two-point formulae for obtaining the numerical soluti...
AbstractA family of test equations is suggested for first and second kind nonsingular Volterra integ...
During the numerical integration of a system of first order differential equations, practical algori...
AbstractIt is well known that the application of one-step or linear multistep methods to an ordinary...
AbstractNumerical integration techniques which have been previously thought of as distinct are shown...
AbstractSome k-step kth order explicit nonlinear multistep methods (NMM) are proposed for both stiff...
AbstractIn this paper we derive new generalized multistep methods with variable stepsize for initial...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
AbstractIn this paper the numerical integration of integrable Hamiltonian systems is considered. Sym...
The numerical integration of reversible dynamical systems is considered. A backward analysis for var...
Strong stability preserving (SSP) methods are designed primarily for time integration of nonlinear h...
AbstractThe author proposes some stable and convergent two-point integration formulae which are part...
A large set of variable coefficient linear systems of ordinary differential equations which possess ...
In this dissertation we consider the stability of numerical methods approximating the solution of bo...
AbstractIn [1], a set of convergent and stable two-point formulae for obtaining the numerical soluti...
AbstractA family of test equations is suggested for first and second kind nonsingular Volterra integ...
During the numerical integration of a system of first order differential equations, practical algori...
AbstractIt is well known that the application of one-step or linear multistep methods to an ordinary...
AbstractNumerical integration techniques which have been previously thought of as distinct are shown...
AbstractSome k-step kth order explicit nonlinear multistep methods (NMM) are proposed for both stiff...
AbstractIn this paper we derive new generalized multistep methods with variable stepsize for initial...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
AbstractIn this paper the numerical integration of integrable Hamiltonian systems is considered. Sym...
The numerical integration of reversible dynamical systems is considered. A backward analysis for var...
Strong stability preserving (SSP) methods are designed primarily for time integration of nonlinear h...
AbstractThe author proposes some stable and convergent two-point integration formulae which are part...
A large set of variable coefficient linear systems of ordinary differential equations which possess ...
In this dissertation we consider the stability of numerical methods approximating the solution of bo...
AbstractIn [1], a set of convergent and stable two-point formulae for obtaining the numerical soluti...
AbstractA family of test equations is suggested for first and second kind nonsingular Volterra integ...
During the numerical integration of a system of first order differential equations, practical algori...