Pages that link to "Item:Q434692"
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The following pages link to A differential quadrature algorithm to solve the two dimensional linear hyperbolic telegraph equation with Dirichlet and Neumann boundary conditions (Q434692):
Displaying 13 items.
- Efficiency analysis of a domain decomposition method for the two-dimensional telegraph equations (Q5164947) (← links)
- (Q5884042) (← links)
- A numerical solution of two-dimensional hyperbolic telegraph equation based on moving least square meshless method and radial basis functions (Q5884056) (← links)
- Barycentric Lagrange interpolation collocation method for solving the sine-Gordon equation (Q6048813) (← links)
- On the use of an accurate implicit spectral approach for the telegraph equation in propagation of electrical signals (Q6060711) (← links)
- Barycentric rational interpolation and local radial basis functions based numerical algorithms for multidimensional <scp>sine‐Gordon</scp> equation (Q6066445) (← links)
- A Haar wavelet collocation approach for solving one and two‐dimensional second‐order linear and nonlinear hyperbolic telegraph equations (Q6088433) (← links)
- Numerical and approximate solutions for two-dimensional hyperbolic telegraph equation via wavelet matrices (Q6103538) (← links)
- Numerical solution of one-dimensional hyperbolic telegraph equation using collocation of cubic B-splines (Q6150866) (← links)
- Numerical solution of coupled 1D Burgers’ equation by employing Barycentric Lagrange interpolation basis function based differential quadrature method (Q6573137) (← links)
- A numerical regime for 1-D Burgers’ equation using UAT tension B-spline differential quadrature method (Q6574354) (← links)
- Numerical solution of coupled 1D Burgers' equation by Non-Uniform Algebraic-Hyperbolic B-spline Differential Quadrature Method (Q6576158) (← links)
- Numerical approximation based on Bernouli polynomials for solving second-order hyperbolic telegraph equations (Q6622771) (← links)
