A new approach for the numerical solution for nonlinear Klein-Gordon equation
From MaRDI portal
Publication:827636
DOI10.1007/s40324-020-00225-yzbMath1455.65193OpenAlexW3034511520MaRDI QIDQ827636
Publication date: 13 January 2021
Published in: S\(\vec{\text{e}}\)MA Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s40324-020-00225-y
KdV equations (Korteweg-de Vries equations) (35Q53) Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs (65M70) Vertex subsets with special properties (dominating sets, independent sets, cliques, etc.) (05C69) PDEs on graphs and networks (ramified or polygonal spaces) (35R02)
Related Items
A new iterative method for the approximate solution of Klein-Gordon and sine-Gordon equations ⋮ A Study on Homotopy Analysis Method and Clique Polynomial Method ⋮ Numerical solution for the fractional-order one-dimensional telegraph equation via wavelet technique ⋮ Highly accurate solutions for space-time fractional Schrödinger equations with non-smooth continuous solution using the hybrid clique functions ⋮ A novel approach for multi dimensional fractional coupled Navier-Stokes equation ⋮ Numerical-solution-for-nonlinear-Klein-Gordon equation via operational-matrix by clique polynomial of complete graphs ⋮ An operational matrix based on the independence polynomial of a complete bipartite graph for the Caputo fractional derivative
Cites Work
- Unnamed Item
- Approximate solution of nonlinear Klein-Gordon equation using Sobolev gradients
- Spectral methods using Legendre wavelets for nonlinear Klein/sine-Gordon equations
- Differential transform method for solving the linear and nonlinear Klein-Gordon equation
- Tension spline approach for the numerical solution of nonlinear Klein-Gordon equation
- Application of homotopy-perturbation method to Klein-Gordon and sine-Gordon equations
- A spline collocation approach for the numerical solution of a generalized nonlinear Klein-Gordon equation
- The variational iteration method for studying the Klein-Gordon equation
- Clique polynomials and independent set polynomials of graphs
- The decomposition method for studying the Klein-Gordon equation
- Theoretical study on continuous polynomial wavelet bases through wavelet series collocation method for nonlinear Lane-Emden type equations
- Haar wavelet collocation method for solving singular and nonlinear fractional time-dependent Emden-Fowler equations with initial and boundary conditions
- Numerical solution of the nonlinear Klein-Gordon equation using radial basis functions
- Two-dimensional Legendre wavelets for solving fractional Poisson equation with Dirichlet boundary conditions
- Numerical solution of the nonlinear Klein-Gordon equation
This page was built for publication: A new approach for the numerical solution for nonlinear Klein-Gordon equation
