Scholars Journal of Research in Mathematics and Computer Science

In this manuscript, the Laplace decomposition method (LDM), variational iteration transform method (VITM) and Laplace homotopy perturbation method (LHPM)  are presented to solve Poisson equation. The methods can be applied to linear and nonlinear problems. To illustrate the simplicity and reliability of the methods, example is provided. The results obtained reveal that the methods are capable and easy to apply.

H. L. zadeh, Y. Khan, E. Hesameddini, A. Rivaz, "A new approach to linear an nonlinear Schrodinger equations", Journal of Advanced Research in Differential Equations, Vol. 3, No. 2, pp. 35-44, (2011).

V.G. Gupta, S. Gupta, "Homotopy Perturbation Transform Method for Solving Initial Boundary Value Problems of Variable Coefficients", International Journal of Nonlinear Science Vol. 12, No.3, pp.270-277, (2011).

Wazwaz, A.M. On multiple soliton solution for coupled KdV- MKdV equation. Nonlinear Science Letter A, 1, pp. 289-296, (2010).

Wang M L. Exact solutions for a compound KdV Burgers equations. Phys. Lett. A, 213 pp. 279-285, (1996).

Yan, Z. Y., Zhang, H. New Explicit solitary wave solutions and periodic wave solutions for Whittam-Broer-Kaup equation in shallow water. Phys. Lett. A, 285, 355-362,(2001).

Karmishin, A V, Zhukov, A .I, Kolosov, V.G. Method of dynamics calculations and testing of Thin-walled structures, Mashinostroyenie. Moscow, Russia.(1990).

He. J. H. Homotopy perturbation techniques. Computer methods in Applied Mechanics and Engineering, 178, pp.257-262, (1999).

Sweilam, N.H., Khader, M.M. Exact solutions of some Coupled nonlinear partial differential equations using the homotopy perturbation method. Computer and Mathematics with Applications, 58, pp. 2134-2141, (2009).

S. Nadjafi, J. Gorbhani, A. He’s Homotopy perturbation method: an effective tool for solving nonlinear integral and integro-differential equations. Computer and Mathematics with Applications, 58, pp.1345-1351, (2009).

He J. H. Variational iteration method- a kind of nonlinear analytical technique: some examples, International Journal of Non linear Mechanics. 34, pp.699-708, (2009).

He J.H, Wu X.H. Variational iteration method: new development and applications. Computer and Mathematics with Applications, 54, pp. 881-894, (2007).

He J.H, Wu G.C. Austin F. The variational iteration method which should be followed. Nonlinear Science Letter A, 1, pp. 1-30, (2009).

Soltani L.A., Shirzadi A. A new modification of variational iteration method. Computer and Mathematics with Applications, 59, pp. 2528-2535, (2010).

Hesameddini. E. Latifizadeh H. "Reconstruction of variational iteration algorithms using the Laplace transform". International Journal of Nonlinear Sciences and Numerical Simulation, 10, pp. 1377-1382, (2009).

Jassim, H. K. Homotopy Perturbation Algorithm Using Laplace Transform for Newell-Whitehead-Segel Equation, International Journal of Advances in Applied Mathematics and Mechanics, vol.2, no. 4, pp. 8-12, (2015).

Chun C., Fourier series based variational iteration method for a reliable treatment of heat equations with variable coefficients. International Journal of Nonlinear Sciences and Numerical Simulation, 10, pp. 1383-1388, (2009).

Adomain G. Solving Frontier problems of Physics: The Decomposition Method. Kluwer Academy Publication, Boston.(1994).

Tatari M., Dehghan M., Razzaghi M. Application of Adomain decomposition method for the Fokker-Planck equation. Mathematics and Computer Modeling, pp. 639-650, (2007).

Wazwaz A.M. The decomposition method for solving higher dimensional initial boundary value problems of variable coefficients. International Journal of Computer Mathematics, Vol. 29, No. 2. ,pp. 159-172, (2000).

Khan Y., Faraz, N. Application of modified Laplace decomposition method for solving boundary layer equation, Journal of King Saud University Science, Vol. 23, No. 1, pp. 115-119 , (2011).

Noor, M. A. and Mohyud Din, S. T. Variational iteration decomposition method for solving higher dimensional initial boundary value problems. International Journal of Nonlinear Sciences, 7, pp. 39-49, (2009).

Syam M.I., A. Hamdan: An efficient method for solving Bratu equations. Appl. Math. Comput., 176, pp. 704-713, (2006).

Yusfoglu E. A. : Numerical solution of Duffing equation by the Laplace decomposition algorithm. Appl. Math. Comput., 177, pp. 572-580. (2006).

Kiymaz O. : An algorithm for solving initial value problems using Laplace Adomian decomposition method. Applied Mathematical Sciences, Vol.3, No.30, pp. 1453-1459, (2009).

Jafari, H., C.M. Khalique, M. Khan and Ghasemi: A two-step Laplace decomposition method for solving nonlinear partial differential equations, International Journal of Physical Sciences, Vol.6, No.16, pp. 4102-4109, (2011).

Wazwaz A. and M.S. Mehanna: The Combined Laplace-Adomian method for handling singular integral equation of Heat transfer. I. J. of nonlinear Science,Vol. 10, No.(2), pp. 248- 252 (2010) .

Hendi F.A.: Laplace Adomian decomposition method for solving the nonlinear Volterra integral equation with weakly kernels, Journal studies in Nonlinear Science (2012).

Fadaei J.: Application of Laplace- Adomian decomposition method on linear and nonlinear system of PDEs. Applied Mathematical Sciences, Vol.5, No.27, pp. 1307-1315, (2011).

Jassim, H. K.: Application of Laplace Decomposition Method and Variational Iteration Transform Method to Solve Laplace Equation, Universal Journal of Mathematics, Vol. 1, No. 1, pp.16-23, (2016).