scientific article; zbMATH DE number 7665270
From MaRDI portal
Publication:5884042
DOI10.22034/cmde.2022.47744.1997MaRDI QIDQ5884042
No author found.
Publication date: 20 March 2023
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
differential quadrature methodhyperbolic telegraph equationmodified cubic B-spline basis functionsdiscretization matrixSSPRK scheme
Second-order hyperbolic equations (35L10) Numerical solution of discretized equations for boundary value problems involving PDEs (65N22) Numerical solution of discretized equations for initial value and initial-boundary value problems involving PDEs (65M22)
Related Items
Numerical solution of one-dimensional hyperbolic telegraph equation using collocation of cubic B-splines, Unnamed Item, Unnamed Item
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A numerical study of two dimensional hyperbolic telegraph equation by modified B-spline differential quadrature method
- Lagrange interpolation and modified cubic B-spline differential quadrature methods for solving hyperbolic partial differential equations with Dirichlet and Neumann boundary conditions
- Numerical simulation of second-order hyperbolic telegraph type equations with variable coefficients
- Numerical solutions of nonlinear Fisher's reaction-diffusion equation with modified cubic B-spline collocation method
- Numerical solutions of nonlinear Burgers equation with modified cubic B-splines collocation 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 new spectral Galerkin method for solving the two dimensional hyperbolic telegraph equation
- Numerical solution of telegraph equation using interpolating scaling functions
- Numerical solution of hyperbolic telegraph equation by cubic B-spline collocation method
- Stability of matrices with negative diagonal submatrices
- Numerical solution of second order one dimensional hyperbolic telegraph equation by cubic B-spline collocation method
- Singularly perturbed telegraph equations with applications in the random walk theory
- Numerical simulation of three-dimensional telegraphic equation using cubic B-spline differential quadrature method
- Differential quadrature solution of hyperbolic telegraph equation
- Adaptive Monte Carlo methods for solving hyperbolic telegraph equation
- Application of the singular boundary method to the two-dimensional telegraph equation on arbitrary domains
- A coupled pseudospectral-differential quadrature method for a class of hyperbolic telegraph equations
- Numerical solution of linear and nonlinear hyperbolic telegraph type equations with variable coefficients using shifted Jacobi collocation method
- A hybrid meshless method for the solution of the second order hyperbolic telegraph equation in two space dimensions
- An accurate meshless collocation technique for solving two-dimensional hyperbolic telegraph equations in arbitrary domains
- A numerical scheme based on weighted average differential quadrature method for the numerical solution of Burgers' equation
- Study of one dimensional hyperbolic telegraph equation via a hybrid cubic B-spline differential quadrature method
- A numerical method for solving the hyperbolic telegraph equation
- Wave splitting of the telegraph equation in R 3 and its application to inverse scattering
- A New Class of Optimal High-Order Strong-Stability-Preserving Time Discretization Methods
- An approximation to the solution of one-dimensional hyperbolic telegraph equation based on the collocation of quadratic B-spline functions
- Numerical solution of second-order hyperbolic telegraph equation via new cubic trigonometric B-splines approach
- New unconditionally stable difference schemes for the solution of multi-dimensional telegraphic equations
