Multistep predictor-corrector method for numerical solution of ordinary differential equations retains high local accuracy and convergence properties. In addition, the method was developed in a form conducive to the generation of effective criteria for the selection of subsequent step sizes in step-by-step solution of differential equations
Predictor-corrector two point block methods are developed for solving first order ordinary different...
Because of the wide variety of differential equations, there seems to be no numerical method which w...
This study is design to examine the reversed estimation of variable step-size implementation for sol...
During the numerical integration of a system of first order differential equations, practical algori...
Study compares the use of five different methods for the computer solution of the restricted three-b...
Numerical solution of differential equations using predictor-corrector multistep methods for stabili...
In a recent paper P.T. Boggs has demonstrated the use of fixed mesh A-stable integration techniques ...
Self-starting multistep methods for numerical integration of ordinary differential equation
AbstractNumerical integration techniques which have been previously thought of as distinct are shown...
The method of undetermined coefficients is used to derive the predictor-corrector equations for the ...
Some of the most accurate and economical of the known numerical methods for solving the initial-valu...
A Variable-stpe-size Block Predictor-corrector Method for Ordinary Differential Equations Background...
Backward differentiation methods are used extensively for integration of stiff systems of ordinary d...
Predictor-corrector two point block methods are developed for solving first order ordinary different...
A 5-step block predictor and 4-step corrector methods aimed at solving general second order ordinary...
Predictor-corrector two point block methods are developed for solving first order ordinary different...
Because of the wide variety of differential equations, there seems to be no numerical method which w...
This study is design to examine the reversed estimation of variable step-size implementation for sol...
During the numerical integration of a system of first order differential equations, practical algori...
Study compares the use of five different methods for the computer solution of the restricted three-b...
Numerical solution of differential equations using predictor-corrector multistep methods for stabili...
In a recent paper P.T. Boggs has demonstrated the use of fixed mesh A-stable integration techniques ...
Self-starting multistep methods for numerical integration of ordinary differential equation
AbstractNumerical integration techniques which have been previously thought of as distinct are shown...
The method of undetermined coefficients is used to derive the predictor-corrector equations for the ...
Some of the most accurate and economical of the known numerical methods for solving the initial-valu...
A Variable-stpe-size Block Predictor-corrector Method for Ordinary Differential Equations Background...
Backward differentiation methods are used extensively for integration of stiff systems of ordinary d...
Predictor-corrector two point block methods are developed for solving first order ordinary different...
A 5-step block predictor and 4-step corrector methods aimed at solving general second order ordinary...
Predictor-corrector two point block methods are developed for solving first order ordinary different...
Because of the wide variety of differential equations, there seems to be no numerical method which w...
This study is design to examine the reversed estimation of variable step-size implementation for sol...