Solution for 'Good' Boussinesq Equation by Applying Differential Method
Keywords:
Differential Method, Good BE, Pseudo Spectral MethodAbstract
In the present problem, we study travelling wave solution for 'good' Boussinesq equation by differential transform method [Lou (1999), Erturk (2007), Arikoglu (2006)], also applied Pade and convergence has been discussed. This method reduces the size of computational work compared to Taylor series method which requires computationally long time for large orders.
References
- Madsen O. S, Mei C. C. 1969 The transformation of a solitary wave over an uneven bottom, J Fl Mech, 39 (4), 781-791.
- Madsen P. A, Murray R. and Sorensen. O. R. 1991 A new form of the Boussinesq equations with improved linear dispersion characteristics. Coastal Engineering, 15, 371-388.
- Madsen P. A, Sorensen. O. R. 1992 A new form of the Boussinesq equations with improved linear dispersion characteristics. Part 2. A slowly varying bathymetry, Coastal Engineering, 18, 183-204.
- Manoranjan, V. S., Ortega, T. and Sanz-Serna. J. M., J. Math. Phys., 1988 Soliton and antisoliton interactions in the “good” Boussinesq equation, 29, 1964-1968.
- Manoranjan. S, Mitchell A. R and Morris J. LI. 1984 Numerical solutions of the “good” Boussinesq equation, Sci. Stat. Comput., SIAM J., 5, 946-958.
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2021-07-30
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How to Cite
[1]
Bhavya B S "Solution for 'Good' Boussinesq Equation by Applying Differential Method" International Journal of Scientific Research in Science and Technology(IJSRST), Online ISSN : 2395-602X, Print ISSN : 2395-6011,Volume 8, Issue 4, pp.777-780, July-August-2021.