Pages that link to "Item:Q4564955"

The following pages link to Moving Least Squares (MLS) Method for the Nonlinear Hyperbolic Telegraph Equation with Variable Coefficients (Q4564955):

Displaying 13 items.

• Numerical solution of systems of fractional delay differential equations using a new kind of wavelet basis (Q1993409) (← links)
• A meshless approach for solving nonlinear variable-order time fractional 2D Ginzburg-Landau equation (Q2209390) (← links)
• Meshfree moving least squares method for nonlinear variable-order time fractional 2D telegraph equation involving Mittag-Leffler non-singular kernel (Q2213472) (← links)
• A meshless method for solving the time fractional advection-diffusion equation with variable coefficients (Q2314275) (← links)
• A meshless technique based on the moving least squares shape functions for nonlinear fractal-fractional advection-diffusion equation (Q2662426) (← links)
• Extending the Meshless Local Petrov–Galerkin Method to Solve Stabilized Turbulent Fluid Flow Problems (Q4557755) (← links)
• A CCD-ADI method for two-dimensional linear and nonlinear hyperbolic telegraph equations with variable coefficients (Q5031842) (← links)
• Generation and Parametrization of Mean Plasma Radiative Properties Databases for Astrophysics and Nuclear Fusion Applications (Q5111952) (← links)
• On a finding the coefficient of one nonlinear wave equation in the mixed problem (Q5150031) (← links)
• Fully Legendre Spectral Galerkin Algorithm for Solving Linear One-Dimensional Telegraph Type Equation (Q5193339) (← links)
• Numerical Solution of Shrödinger Equations Based on the Meshless Methods (Q5881382) (← links)
• Local Galerkin method based on the moving least squares approximation for solving delay integral equations arisen from an air pollution model (Q6564390) (← links)
• A numerical technique based on Legendre wavelet for linear and nonlinear hyperbolic telegraph equation (Q6586155) (← links)