Journal of Engineering and Applied Sciences
Year:
2020
Volume:
15
Issue:
10
Page No.
2362 - 2369
References
Abbasbandy, S. and M.T. Darvishi, 2005. A numerical solution of Burger's equation by modified Adomian method. Applied Math. Comput., 163: 1265-1272.
CrossRef | Direct Link | Ablowitz, M.J. and P.A. Clarkson, 1991. Solitons, Nonlinear Evolution Equations and Inverse Scattering. 1st Edn., Cambridge University Press, Cambridge.
Aksan, E.N., 2006. Quadratic B-spline finite element method for numerical solution of the Burgers equation. Applied Math. Comput., 174: 884-896.
CrossRef | Direct Link | Al-Shimmary, A.F.A. and S.K. Radhi, 2015. Solving nonlinear partial differential equations using tanh and first integral-methods. J. Kerbala Univ., 13: 59-72.
Direct Link | Al-Shimmary, A.F.A., 2017. Solving initial value problem using Runge-Kutta 6th order method. ARPN. J. Eng. Applied Sci., 12: 3953-3961.
Direct Link | Cherruault, Y. and G. Adomian, 1993. Decomposition methods: A new proof of convergence. Math. Comput. Modelling, 18: 103-106.
CrossRef | Direct Link | Cherruault, Y., 1990. Convergence of Adomian’s method. Math. Comput. Modell., 14: 83-86.
CrossRef | Direct Link | Cole, J.D., 1951. On a quasi-linear parabolic equation occurring in aerodynamics. Quart. Applied Math., 9: 225-236.
Direct Link | Cordero, A., A. Franques and J.R. Torregrosa, 2015. Numerical solution of turbulence problems by solving Burgers equation. Algorithms, 8: 224-233.
CrossRef | Direct Link | Fan, E. and Y.C. Hona, 2002. Generalized tanh method extended to special types of nonlinear equations. J. Nat. Sci. A., 57: 692-700.
CrossRef | Direct Link | Fletcher, C.A., 1983. Generating exact solutions of the two‐dimensional Burgers' equations. Int. J. Numer. Meth. Fluids, 3: 213-216.
CrossRef | Direct Link | Gomez S, C.A., 2007. Special forms of the fifth-order KdV equation with new periodic and soliton solutions. Applied Math. Comput., 189: 1066-1077.
CrossRef | Direct Link | Gomez, C.A.S., 2006. Exact solutions for a new fifth-order integrable system. Colomb. Math. Mag., 40: 119-125.
Direct Link | He, J.H., 1999. Variational iteration method: A kind of non-linear analytical technique. Some examples. Int. J. Nonlinear Mech., 344: 699-699.
CrossRef | Direct Link | Hirota, R., 1971. Exact solution of the Korteweg-de Vries equation for multiple collisions of solitons. Phys. Rev. Lett., 27: 1192-1194.
CrossRef | Direct Link | Hopf, E., 1950. The partial differential equation ut+ uux= μxx†. Commun. Pure Applied Math., 3: 201-230.
CrossRef | Direct Link | Kanth, A.S.V.R. and K. Aruna, 2009. Differential transform method for solving the linear and nonlinear Klein-Gordon equation. Comput. Phys. Commun., 180: 708-711.
CrossRef | Kutluay, S. and A. Esen, 2004. A lumped Galerkin method for solving the Burgers equation. Intl. J. Comput. Math., 81: 1433-1444.
CrossRef | Direct Link | Olver, P.J., 2016. Introduction to Partial Differential Equations. Springer, Berlin, Germany,.
Sierra, C.A.G. and A.H.S. Salas, 2007. Exact solutions for a reaction diffusion equation by using the generalized tanh method. Sci. Technol., 1: 409-410.
Direct Link | Wazwaz, A.M., 2007. The extended tanh method for new solitons solutions for many forms of the fifth-order KdV equations. Applied Math. Comput., 184: 1002-1014.
CrossRef | Direct Link | Zhou, J.K., 1986. Differential Transformation and its Applications for Electrical Circuits. Huazhong University Press, Wuhan, China.