A direct meshless method for solving two-dimensional second-order hyperbolic telegraph equations
From MaRDI portal
Publication:2225567
DOI10.1155/2020/8832197zbMath1489.65151OpenAlexW3106323242WikidataQ115521635 ScholiaQ115521635MaRDI QIDQ2225567
Publication date: 8 February 2021
Published in: Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2020/8832197
Initial-boundary value problems for second-order hyperbolic equations (35L20) Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs (65M70) Numerical radial basis function approximation (65D12)
Related Items (2)
A reliable and fast mesh-free solver for the telegraph equation ⋮ A novel meshless space-time backward substitution method and its application to nonhomogeneous advection-diffusion problems
Uses Software
Cites Work
- Unnamed Item
- A numerical study of two dimensional hyperbolic telegraph equation by modified B-spline differential quadrature method
- A differential quadrature algorithm to solve the two dimensional linear hyperbolic telegraph equation with Dirichlet and Neumann boundary conditions
- Combination of meshless local weak and strong (MLWS) forms to solve the two-dimensional hyperbolic telegraph equation
- A comparison study of meshfree techniques for solving the two-dimensional linear hyperbolic telegraph equation
- A Taylor matrix method for the solution of a two-dimensional linear hyperbolic equation
- Space-time radial basis functions
- Multiquadrics -- a scattered data approximation scheme with applications to computational fluid-dynamics. II: Solutions to parabolic, hyperbolic and elliptic partial differential equations
- A local radial basis function collocation method for band structure computation of 3D phononic crystals
- Application of the singular boundary method to the two-dimensional telegraph equation on arbitrary domains
- Numerical solution of linear and nonlinear hyperbolic telegraph type equations with variable coefficients using shifted Jacobi collocation method
- The sample solution approach for determination of the optimal shape parameter in the multiquadric function of the Kansa method
- Fast boundary-domain integral method for unsteady convection-diffusion equation with variable diffusivity using the modified Helmholtz fundamental solution
- Kamenev and Philos-types oscillation criteria for fourth-order neutral differential equations
- A meshless collocation method for band structure simulation of nanoscale phononic crystals based on nonlocal elasticity theory
- On the asymptotic and oscillatory behavior of the solutions of a class of higher-order differential equations with middle term
- A hybrid meshless method for the solution of the second order hyperbolic telegraph equation in two space dimensions
- Analysis of three-dimensional anisotropic heat conduction problems on thin domains using an advanced boundary element method
- An accurate meshless collocation technique for solving two-dimensional hyperbolic telegraph equations in arbitrary domains
- Combinations of the method of fundamental solutions for general inverse source identification problems
- On choosing ``optimal shape parameters for RBF approximation
- An operator splitting method for an unconditionally stable difference scheme for a linear hyperbolic equation with variable coefficients in two space dimensions
- On the oscillation of certain fourth-order differential equations with \(p\)-Laplacian like operator
- An unconditionally stable alternating direction implicit scheme for the two space dimensional linear hyperbolic equation
- A method based on meshless approach for the numerical solution of the two-space dimensional hyperbolic telegraph equation
- Investigation of regularized techniques for boundary knot method
- The use of He's variational iteration method for solving the telegraph and fractional telegraph equations
- Stable Computations with Gaussian Radial Basis Functions
- A meshless method for numerical solution of a linear hyperbolic equation with variable coefficients in two space dimensions
- Improved 3D Surface Reconstruction via the Method of Fundamental Solutions
- High order implicit collocation method for the solution of two‐dimensional linear hyperbolic equation
- New unconditionally stable difference schemes for the solution of multi-dimensional telegraphic equations
This page was built for publication: A direct meshless method for solving two-dimensional second-order hyperbolic telegraph equations
