AbstractIn this paper we present a study of consistency, stability and convergence properties of linear multiderivative multistep variable stepsize variable formula methods
AbstractThis paper presents an analysis of the Taylor method for the numerical solution of ODEs when...
AbstractWe introduce and study multistep formulae of arbitrary order with step variation facilities....
AbstractIn this paper the A0-stability of interpolatory, variable coefficient and fixed leading coef...
During the numerical integration of a system of first order differential equations, practical algori...
AbstractIn this paper we present a study of consistency, stability and convergence properties of lin...
Backward differentiation methods are used extensively for integration of stiff systems of ordinary d...
AbstractIn this paper we derive new generalized multistep methods with variable stepsize for initial...
AbstractGeneralized Hermite multistep methods for initial-value problems in ordinary differential eq...
Convergence and stability of variable-stepsize variable-formula multistep multiderivative method
In this monograph, we develop a subclass of variable coefficient multistep (VCM) methods, which is A...
A new polynomial formulation of variable step size linear multistep methods is presented, where each...
A family of two-step multiderivative methods based on Pade approximants to the exponential function ...
AbstractNumerical integration techniques which have been previously thought of as distinct are shown...
AbstractWe develop a variable-order, variable-step algorithm for solving second-order initial-value ...
AbstractThis paper deals with the achievement of explicit computable bounds for the global discretiz...
AbstractThis paper presents an analysis of the Taylor method for the numerical solution of ODEs when...
AbstractWe introduce and study multistep formulae of arbitrary order with step variation facilities....
AbstractIn this paper the A0-stability of interpolatory, variable coefficient and fixed leading coef...
During the numerical integration of a system of first order differential equations, practical algori...
AbstractIn this paper we present a study of consistency, stability and convergence properties of lin...
Backward differentiation methods are used extensively for integration of stiff systems of ordinary d...
AbstractIn this paper we derive new generalized multistep methods with variable stepsize for initial...
AbstractGeneralized Hermite multistep methods for initial-value problems in ordinary differential eq...
Convergence and stability of variable-stepsize variable-formula multistep multiderivative method
In this monograph, we develop a subclass of variable coefficient multistep (VCM) methods, which is A...
A new polynomial formulation of variable step size linear multistep methods is presented, where each...
A family of two-step multiderivative methods based on Pade approximants to the exponential function ...
AbstractNumerical integration techniques which have been previously thought of as distinct are shown...
AbstractWe develop a variable-order, variable-step algorithm for solving second-order initial-value ...
AbstractThis paper deals with the achievement of explicit computable bounds for the global discretiz...
AbstractThis paper presents an analysis of the Taylor method for the numerical solution of ODEs when...
AbstractWe introduce and study multistep formulae of arbitrary order with step variation facilities....
AbstractIn this paper the A0-stability of interpolatory, variable coefficient and fixed leading coef...
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