Commenced in January 2007
Frequency: Monthly
Edition: International
Paper Count: 33090
Adomian Decomposition Method Associated with Boole-s Integration Rule for Goursat Problem
Authors: Mohd Agos Salim Nasir, Ros Fadilah Deraman, Siti Salmah Yasiran
Abstract:
The Goursat partial differential equation arises in linear and non linear partial differential equations with mixed derivatives. This equation is a second order hyperbolic partial differential equation which occurs in various fields of study such as in engineering, physics, and applied mathematics. There are many approaches that have been suggested to approximate the solution of the Goursat partial differential equation. However, all of the suggested methods traditionally focused on numerical differentiation approaches including forward and central differences in deriving the scheme. An innovation has been done in deriving the Goursat partial differential equation scheme which involves numerical integration techniques. In this paper we have developed a new scheme to solve the Goursat partial differential equation based on the Adomian decomposition (ADM) and associated with Boole-s integration rule to approximate the integration terms. The new scheme can easily be applied to many linear and non linear Goursat partial differential equations and is capable to reduce the size of computational work. The accuracy of the results reveals the advantage of this new scheme over existing numerical method.Keywords: Goursat problem, partial differential equation, Adomian decomposition method, Boole's integration rule.
Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1073409
Procedia APA BibTeX Chicago EndNote Harvard JSON MLA RIS XML ISO 690 PDF Downloads 1854References:
[1] G. Adomian, A Review of the Decomposition Method in Applied Mathematics, Journal of Mathematical Analysis and Application, Vol.135, No.2, 1988, pp.501-544.
[2] M.A. A1-Alaoui, A Class of Numerical Integration Rule With First Class Order Derivatives, University Research Board of the American University of Beirut, 1990, pp.25-44.
[3] Y.L. An and W.C. Hua, The Discontinuous Ivp of A Reacting Gas Flow System, Transaction of the American Mathematical Society, 1981.
[4] R.K. Arnold and W.U. Christoph, Numerical Integration on Advanced Computer System, Germany: Springer-Verlag Berlin Heidelberg, 1994, pp.5-23.
[5] S.A. Aseeri, Goursat Functions for A Problem of An Isotropic Plate with A Curvilinear Hole, International Journal for Open Problems Computer Mathematic, Vol.1, 2008, pp.266-285.
[6] L.G. Bushnell, D. Tilbury and S.S. Sastry, Extended Goursat Normal Form With Application to Nonholonomic Motion Planning, Electronic Research Laboratory University of California, 1994, pp.1-12.
[7] S.M. Cathleen, The Mathematical Approach to the Sonic Barrier, Bulletin of the American Mathematical Society, Vol.2, 1982, pp.127- 145.
[8] S. Chen and D. Li, Supersonic Flow Past A Symmetrically Curved Cone, Indiana University Mathematics Journal, 2000.
[9] T. Dawn, Trajectory Generation for the N-Trailer Problem Using Goursat Normal Form, IEEE Transactions on Automatic Control, Vol.40, 1995, pp.802-819.
[10] A.I. Ismail and M.A.S. Nasir, Numerical Solution of the Goursat Problem, IASTED Conference on Applied Simulation And Modelling, 2004, pp.243-246.
[11] Y. Susumu, Goursat Problem for A Microdifferential Operator of Fuchsian Type and Its Application, RIMS Kyoto University, Vol.33, 1997, pp.559-641.
[12] H. Taghvafard and H.G. Erjaee, Two-Dimensional Differential Transform Method for Solving Linear and Non-Linear Goursat problem, International Journal for Engineering and Mathematical Sciences, Vol.6, No.2, 2010, pp.103-106.
[13] A.M. Wazwaz, On the Numerical Solution for the Goursat Problem, Applied Mathematics and Computational, Vol.59, 1993, pp.89-95.
[14] A.M. Wazwaz, The Decomposition Method for Approximate Solution of Goursat Problem, Applied Mathematics and Computational, Vol.69, 1995, pp.229-311.