The Maple Program Procedures at Solution Systems of Differential Equation with Taylor Collocation Method
DOI10.1007/978-3-319-06923-4_10zbMath1319.65071OpenAlexW2222975385MaRDI QIDQ5265309
Yıldıray Keskin, Galip Oturanç, Sema Servi
Publication date: 23 July 2015
Published in: Springer Proceedings in Mathematics & Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-319-06923-4_10
comparison of methodsnumerical examplesAdomian decomposition methoddifferential transform methodMaple programsystems of differential equationsTaylor collocation method
Finite element, Rayleigh-Ritz, Galerkin and collocation methods for ordinary differential equations (65L60) Numerical solution of boundary value problems involving ordinary differential equations (65L10) Linear boundary value problems for ordinary differential equations (34B05) Nonlocal and multipoint boundary value problems for ordinary differential equations (34B10) Packaged methods for numerical algorithms (65Y15) Numerical algorithms for computer arithmetic, etc. (65Y04)
Related Items (1)
Uses Software
Cites Work
- The approximate solution of high-order linear fractional differential equations with variable coefficients in terms of generalized Taylor polynomials
- Solving frontier problems of physics: the decomposition method
- Solution of the system of ordinary differential equations by Adomian decomposition method.
- Approximate solution of general high-order linear nonhomogeneous difference equations by means of Taylor collocation method
- A Taylor polynomial approach for solving differential-difference equations
- The differential transform approximation for the system of ordinary differential equations
- Taylor polynomial solutions of systems of linear differential equations with variable coefficients
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