[PDF] Top 20 The variational iteration method for solving Nagumo telegraph equation

... He, Variational iteration method for delay dierential equations, Commun. Siene and Nume[r] ... See full document

... differential equation is solved by using the Adomian’s decomposition method (ADM) , modified Adomian’s decomposition method (MADM), variational iteration method (VIM), modified ... See full document

... modified variational iteration method for solving linear ...modified variational iteration method for solving the heat transfer problems with variable ...The ... See full document

... Omolbanin Sedaghatfar was born in the Tehran, Shahr-e-rey in 1982. She received B.Sc and M.Sc de- gree in applied mathematics from Zahedan Branch, Tehran - Science and Research Branch, IAU , re- spectively, and her Ph.D ... See full document

... The variational iteration method, which is a modified general Lagrange multiplier method [34] has been shown to solve effectively, easily and accurately, a large class of nonlinear problems ... See full document

... In this letter, we have successfully developed HPM and ADM to obtain the exact solutions of Dispersive equation. The results are then compared with those of VIM. It is apparently seen that these methods are very ... See full document

... He’s variational iteration method for solving nonlinear partial integro-differential ...This method is a very powerful method for solving a large amount of ...the ... See full document

... paper, Variational iteration transform method is employed to determine the exact solution of the Burger equation which is one-dimensional and coupled Burger ’ s equations nonlinear partial ... See full document

... Instead of solving the differential with nth derivative, we go further to solve differential equation with fractional order of derivative. As a parable, when we write x 3 we know that x 3    x x x which ... See full document

... fractional variational iteration method is given to handle the damped wave equation and dissipative wave equation in fractal ...fractional variational iteration ... See full document

... Riccati equation plays a great role in blueprint and analysis the linear and nonlinear optimal control ...this equation has been acquired by applying Adomian’s decomposition method [1], homotopy ... See full document

... Black-Scholes equation is solved by using the Adomian’s decomposition method , modified Adomian’s decomposition method , variational iteration method , modified ... See full document

... this method, the time interval is divided into n equal subintervals and the method is applied once to each ...Riccati equation by the homo- topy perturbation method [1], the iterated He’s ... See full document

... In recent years, many different orthogonal functions and polynomials have been used to approximate the solution of various functional equations. The main goal of using or- thogonal basis is that the equation under ... See full document

... for solving the linear and non-linear ordinary differential equa- tions, partial differential equations and integral ...spectral method has the advantage of exponential convergence property when orthogonal ... See full document

... Variational Iteration method using He's polynomials can be used to construct solitary solution and compacton-like solution for nonlinear dispersive ... See full document

... diffusion Nagumo equation within a new geometric method, ...to equation () were obtained. After the reduction of this equation by utilizing the Lie symmetries, the traveling wave ... See full document

... differential equation, we will have a fuzzy fractional differential ...integral equation of fractional order and under some assumptions gave a fuzzy successive ... See full document

... Here we combine both types of differential equations, of fractional order and with un- certainty, to consider a new type of dynamical system: fuzzy differential equations of frac- tional order []. The objective of the ... See full document

... y  t  y t    y    y   (41) where the last term of right is called “correction”,  n is a general Lagrange multiplier. The above functional is called correction functional, the Lagrange multiplier in the ... See full document