Pages that link to "Item:Q2016368"
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The following pages link to Compact difference schemes for solving telegraphic equations with Neumann boundary conditions (Q2016368):
Displaying 13 items.
- A class of difference scheme for solving telegraph equation by new non-polynomial spline methods (Q426462) (← links)
- A new unconditionally stable method for telegraph equation based on associated Hermite orthogonal functions (Q504792) (← links)
- Fourth-order compact difference and alternating direction implicit schemes for telegraph equations (Q1948854) (← links)
- Numerical simulation of a class of nonlinear wave equations by lattice Boltzmann method (Q2401492) (← links)
- Fourth-order cubic B-spline collocation method for hyperbolic telegraph equation (Q2690421) (← links)
- The numerical study of a hybrid method for solving telegraph equation (Q2690708) (← links)
- A new fourth-order difference scheme for solving an<i>N</i>-carrier system with Neumann boundary conditions (Q2885569) (← links)
- Compact difference schemes for heat equation with Neumann boundary conditions (Q3644860) (← links)
- Unconditionally stable modified methods for the solution of two‐ and three‐dimensional telegraphic equation with Robin boundary conditions (Q4966598) (← links)
- Numerical solution of second-order hyperbolic telegraph equation via new cubic trigonometric B-splines approach (Q5193457) (← links)
- A compact local one‐dimensional scheme for solving a 3D <i>N</i>‐carrier system with Neumann boundary conditions (Q5747612) (← links)
- A numerical Haar wavelet-finite difference hybrid method and its convergence for nonlinear hyperbolic partial differential equation (Q6045555) (← links)
- Numerical simulation of power transmission lines (Q6120245) (← links)
