A Comparative Study on the Stability of Laplace-Adomian Algorithm and Numerical Methods in Generalized Pantograph Equations
Copyright policy )A Comparative Study on the Stability of Laplace-Adomian Algorithm and Numerical Methods in Generalized Pantograph Equations
The main objective of this paper is to examine the stability and convergence of the Laplace-Adomian algorithm to approximate solutions of the pantograph-type differential equations with multiple delays. This is done by comparatively investigating it with other methods.
- Harbin Institute of Technology China (People's Republic of)
- Sinnar University Sudan
convergence, pantograph-type differential equations, Laplace-Adomian algorithm, multiple delays, Numerical methods for functional-differential equations, stability, Numerical approximation of solutions of functional-differential equations, Stability and convergence of numerical methods for ordinary differential equations
convergence, pantograph-type differential equations, Laplace-Adomian algorithm, multiple delays, Numerical methods for functional-differential equations, stability, Numerical approximation of solutions of functional-differential equations, Stability and convergence of numerical methods for ordinary differential equations
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