Add to ORKGIn this paper, we develop the numerical solution of nonlinear Klein-Gordon equation (NKGE) using the meshless methods. The finite difference scheme and the radial basis functions (RBFs) collocation methods are used to discretize time derivative and spatial derivatives, respectively. Numerical results are given to confirm the accuracy and efficiency of the presented schemes.Publisher's Versio
In this work, we address the problem of solving nonlinear general Klein–Gordon equations (nlKGEs). D...
In this paper, a meshless method of lines (MOL) is applied for the numerical solution of nonlinear s...
In this work, we develop a matrix method based on collocation points and Laguerre polynomials to obt...
AbstractA numerical method is developed to solve the nonlinear one-dimensional Klein–Gordon equation...
In this paper, numerical solution of the nonlinear Klein-Gordon equation is obtained by using the cu...
Nonlinear partial differential equations are often used to understand and modelnonlinear processes a...
A numerical method based on radial basis functions (RBFs) is pro-posed for the numerical solution of...
Copyright c⃝2015 by authors, all rights reserved. Authors agree that this article remains permanentl...
AbstractThe nonlinear Klein–Gordon equation is used to model many nonlinear phenomena. In this paper...
The nonlinear Klein-Gordon equation (KGE) models many nonlinear phenomena. In this paper, we propose...
Numerical approximation of nonlinear Klein-Gordon (KG) equation with quadratic and cubic nonlinearit...
In this study, three powerful methods, the VIM, NIM and ADM were applied to find the solution of the...
AbstractThe decomposition method is applied to the initial/boundary value problem for the nonlinear ...
A numerical method based on collocation points is developed to solve the nonlinear Klein-Gordon equa...
In this paper we develop a finite-difference scheme to approximate radially symmetric solutions of ...
In this work, we address the problem of solving nonlinear general Klein–Gordon equations (nlKGEs). D...
In this paper, a meshless method of lines (MOL) is applied for the numerical solution of nonlinear s...
In this work, we develop a matrix method based on collocation points and Laguerre polynomials to obt...
AbstractA numerical method is developed to solve the nonlinear one-dimensional Klein–Gordon equation...
In this paper, numerical solution of the nonlinear Klein-Gordon equation is obtained by using the cu...
Nonlinear partial differential equations are often used to understand and modelnonlinear processes a...
A numerical method based on radial basis functions (RBFs) is pro-posed for the numerical solution of...
Copyright c⃝2015 by authors, all rights reserved. Authors agree that this article remains permanentl...
AbstractThe nonlinear Klein–Gordon equation is used to model many nonlinear phenomena. In this paper...
The nonlinear Klein-Gordon equation (KGE) models many nonlinear phenomena. In this paper, we propose...
Numerical approximation of nonlinear Klein-Gordon (KG) equation with quadratic and cubic nonlinearit...
In this study, three powerful methods, the VIM, NIM and ADM were applied to find the solution of the...
AbstractThe decomposition method is applied to the initial/boundary value problem for the nonlinear ...
A numerical method based on collocation points is developed to solve the nonlinear Klein-Gordon equa...
In this paper we develop a finite-difference scheme to approximate radially symmetric solutions of ...
In this work, we address the problem of solving nonlinear general Klein–Gordon equations (nlKGEs). D...
In this paper, a meshless method of lines (MOL) is applied for the numerical solution of nonlinear s...
In this work, we develop a matrix method based on collocation points and Laguerre polynomials to obt...