Pages that link to "Item:Q278485"

The following pages link to A numerical study of two dimensional hyperbolic telegraph equation by modified B-spline differential quadrature method (Q278485):

Displaying 50 items.

• Lagrange interpolation and modified cubic B-spline differential quadrature methods for solving hyperbolic partial differential equations with Dirichlet and Neumann boundary conditions (Q314017) (← links)
• A differential quadrature algorithm to solve the two dimensional linear hyperbolic telegraph equation with Dirichlet and Neumann boundary conditions (Q434692) (← links)
• A new spectral Galerkin method for solving the two dimensional hyperbolic telegraph equation (Q521533) (← links)
• A meshless collocation approach with barycentric rational interpolation for two-dimensional hyperbolic telegraph equation (Q671122) (← links)
• Numerical solution of hyperbolic telegraph equation by cubic B-spline collocation method (Q671148) (← links)
• Numerical solution of second order one dimensional hyperbolic telegraph equation by cubic B-spline collocation method (Q902535) (← links)
• Quartic spline methods for solving one-dimensional telegraphic equations (Q969165) (← links)
• Haar wavelet methods for numerical solutions of Harry Dym (HD), BBM Burger's and 2D diffusion equations (Q1670514) (← links)
• Cubic B-spline fuzzy transforms for an efficient and secure compression in wireless sensor networks (Q1671690) (← links)
• Numerical study of Schrödinger equation using differential quadrature method (Q1688796) (← links)
• Wavelet methods for solving three-dimensional partial differential equations (Q1704483) (← links)
• Application of Bernoulli matrix method for solving two-dimensional hyperbolic telegraph equations with Dirichlet boundary conditions (Q1732489) (← links)
• Numerical solutions of coupled Klein-Gordon-Zakharov equations by quintic B-spline differential quadrature method (Q1736119) (← links)
• Numerical simulation of three-dimensional telegraphic equation using cubic B-spline differential quadrature method (Q1740069) (← links)
• Differential quadrature solution of hyperbolic telegraph equation (Q1760890) (← links)
• Adaptive Monte Carlo methods for solving hyperbolic telegraph equation (Q1789723) (← links)
• Bernoulli collocation method for solving linear multidimensional diffusion and wave equations with Dirichlet boundary conditions (Q1798438) (← links)
• Numerical solution of linear and nonlinear hyperbolic telegraph type equations with variable coefficients using shifted Jacobi collocation method (Q1993511) (← links)
• Numerical simulation on hyperbolic diffusion equations using modified cubic B-spline differential quadrature methods (Q2006218) (← links)
• Numerical solution of second-order two-dimensional hyperbolic equation by bi-cubic B-spline collocation method (Q2041127) (← links)
• The fragile points method (FPM) to solve two-dimensional hyperbolic telegraph equation using point stiffness matrices (Q2058090) (← links)
• The Crank-Nicolson finite element method for the 2D uniform transmission line equation (Q2069394) (← links)
• On skewed grid point iterative method for solving 2D hyperbolic telegraph fractional differential equation (Q2114310) (← links)
• Numerical study of multi-dimensional hyperbolic telegraph equations arising in nuclear material science via an efficient local meshless method (Q2142737) (← links)
• A reduced order extrapolating technique of solution coefficient vectors to collocation spectral method for telegraph equation (Q2144077) (← links)
• A reliable and fast mesh-free solver for the telegraph equation (Q2158587) (← links)
• Exponential Jacobi spectral method for hyperbolic partial differential equations (Q2179021) (← links)
• Extension of triple Laplace transform for solving fractional differential equations (Q2180331) (← links)
• Meshfree moving least squares method for nonlinear variable-order time fractional 2D telegraph equation involving Mittag-Leffler non-singular kernel (Q2213472) (← links)
• A direct meshless method for solving two-dimensional second-order hyperbolic telegraph equations (Q2225567) (← links)
• Lagrange's operational approach for the approximate solution of two-dimensional hyperbolic telegraph equation subject to Dirichlet boundary conditions (Q2284785) (← 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)
• Numerical simulation of reaction-diffusion systems by modified cubic B-spline differential quadrature method (Q2408297) (← links)
• Fourth-order cubic B-spline collocation method for hyperbolic telegraph equation (Q2690421) (← links)
• Unconditionally stable modified methods for the solution of two‐ and three‐dimensional telegraphic equation with Robin boundary conditions (Q4966598) (← links)
• NEW HYBRID TECHNIQUE FOR SOLVING THREE DIMENSIONAL TELEGRAPH EQUATIONS (Q5076299) (← links)
• (Q5151359) (← links)
• Efficiency analysis of a domain decomposition method for the two-dimensional telegraph equations (Q5164947) (← links)
• Numerical solution of second-order hyperbolic telegraph equation via new cubic trigonometric B-splines approach (Q5193457) (← links)
• A reliable analytic study for higher-dimensional telegraph equation (Q5205382) (← links)
• (Q5884042) (← links)
• On the use of an accurate implicit spectral approach for the telegraph equation in propagation of electrical signals (Q6060711) (← 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)
• Non-overlapping rectangular domain decomposition method for two-dimensional telegraph equations (Q6164494) (← 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)
• A numerical technique based on Legendre wavelet for linear and nonlinear hyperbolic telegraph equation (Q6586155) (← links)