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The following pages link to An Unconditionally Stable ADI Method for the Linear Hyperbolic Equation in Three Space Dimensions (Q4331106):

Displaying 16 items.

A two-level compact ADI method for solving second-order wave equations (Q2855768) (← links)
Application of a fourth-order compact ADI method to solve a two-dimensional linear hyperbolic equation (Q2868170) (← links)
Compact alternating direction implicit method to solve two-dimensional nonlinear delay hyperbolic differential equations (Q2921904) (← links)
A new unconditionally stable ADI compact scheme for the two-space-dimensional linear hyperbolic equation (Q3056362) (← links)
Unconditionally stable ADI scheme of higher-order for linear hyperbolic equations (Q3066953) (← links)
Numerical solution of hyperbolic telegraph equation using the Chebyshev tau method (Q3404548) (← links)
Legendre multiwavelet Galerkin method for solving the hyperbolic telegraph equation (Q3560231) (← links)
A meshless method for numerical solution of a linear hyperbolic equation with variable coefficients in two space dimensions (Q3612522) (← links)
A New Fast Algorithm Based on Half-Step Discretization for 3D Quasilinear Hyperbolic Partial Differential Equations (Q4557761) (← links)
Moving Least Squares (MLS) Method for the Nonlinear Hyperbolic Telegraph Equation with Variable Coefficients (Q4564955) (← links)
A CCD-ADI method for two-dimensional linear and nonlinear hyperbolic telegraph equations with variable coefficients (Q5031842) (← links)
Numerical solution of second-order hyperbolic telegraph equation via new cubic trigonometric B-splines approach (Q5193457) (← links)
Taylor polynomial solution of hyperbolic type partial differential equations with constant coefficients (Q5391507) (← links)
Higher‐order algorithms for stable solutions of fractional time‐dependent nonlinear telegraph equations in space (Q6089123) (← links)
Numerical and approximate solutions for two-dimensional hyperbolic telegraph equation via wavelet matrices (Q6103538) (← links)
A numerical technique based on Legendre wavelet for linear and nonlinear hyperbolic telegraph equation (Q6586155) (← links)