Pages that link to "Item:Q671122"

The following pages link to A meshless collocation approach with barycentric rational interpolation for two-dimensional hyperbolic telegraph equation (Q671122):

Displaying 27 items.

• A new unconditionally stable method for telegraph equation based on associated Hermite orthogonal functions (Q504792) (← links)
• A Crank-Nicolson collocation spectral method for the two-dimensional telegraph equations (Q824605) (← links)
• A Galerkin-like scheme to solve two-dimensional telegraph equation using collocation points in initial and boundary conditions (Q1672688) (← links)
• Numerical solution of linear and nonlinear hyperbolic telegraph type equations with variable coefficients using shifted Jacobi collocation method (Q1993511) (← links)
• The fragile points method (FPM) to solve two-dimensional hyperbolic telegraph equation using point stiffness matrices (Q2058090) (← links)
• A reduced-order extrapolated finite difference iterative scheme for uniform transmission line equation (Q2058421) (← links)
• The Crank-Nicolson finite element method for the 2D uniform transmission line equation (Q2069394) (← links)
• A multidimensional reverse interpolation method and its application in solving the multidimensional Fredholm integral equations (Q2114956) (← links)
• A reduced order extrapolating technique of solution coefficient vectors to collocation spectral method for telegraph equation (Q2144077) (← links)
• An accurate computational method for two-dimensional (2D) fractional Rayleigh-Stokes problem for a heated generalized second grade fluid via linear barycentric interpolation method (Q2147341) (← links)
• A hybrid meshless method for the solution of the second order hyperbolic telegraph equation in two space dimensions (Q2191598) (← links)
• Two meshless methods based on local radial basis function and barycentric rational interpolation for solving 2D viscoelastic wave equation (Q2192504) (← links)
• A direct meshless method for solving two-dimensional second-order hyperbolic telegraph equations (Q2225567) (← links)
• An accurate meshless collocation technique for solving two-dimensional hyperbolic telegraph equations in arbitrary domains (Q2334256) (← links)
• A collocation approach for solving two-dimensional second-order linear hyperbolic equations (Q2335736) (← links)
• Least square homotopy solution to hyperbolic telegraph equations: multi-dimension analysis (Q2657515) (← links)
• A method based on meshless approach for the numerical solution of the two-space dimensional hyperbolic telegraph equation (Q2910827) (← links)
• Linear barycentric rational collocation method for solving telegraph equation (Q4957906) (← links)
• Two meshless methods based on pseudo spectral delta-shaped basis functions and barycentric rational interpolation for numerical solution of modified Burgers equation (Q5031243) (← links)
• Efficiency analysis of a domain decomposition method for the two-dimensional telegraph equations (Q5164947) (← links)
• A steady barycentric Lagrange interpolation method for the 2D higher‐order time‐fractional telegraph equation with nonlocal boundary condition with error analysis (Q5239816) (← links)
• Barycentric rational interpolation and local radial basis functions based numerical algorithms for multidimensional <scp>sine‐Gordon</scp> equation (Q6066445) (← links)
• An interpolation method for the optimal control problem governed by the elliptic convection–diffusion equation (Q6086448) (← links)
• Numerical simulation of two‐dimensional and three‐dimensional generalized<scp>Klein–Gordon–Zakharov</scp>equations with power law nonlinearity via a meshless collocation method based on barycentric rational interpolation (Q6089109) (← links)
• BARYCENTRIC RATIONAL INTERPOLATION METHOD OF THE HELMHOLTZ EQUATION WITH IRREGULAR DOMAIN (Q6107721) (← links)
• Numerical solution of coupled 1D Burgers’ equation by employing Barycentric Lagrange interpolation basis function based differential quadrature method (Q6573137) (← links)
• An algorithm for the Burgers' equation using barycentric collocation method with a high-order exponential Lie-group scheme (Q6578311) (← links)