Moving Least Squares (MLS) Method for the Nonlinear Hyperbolic Telegraph Equation with Variable Coefficients

Abstract: Telegraph equation which widely used for modeling many engineering and physical phenomena has considered by some researchers in recent years. In this paper, a numerical scheme based on the moving least squares (MLS) approximation and finite difference method (FDM) is proposed for solving a class of the nonlinear hyperbolic telegraph equation with variable coefficients. In the new developed scheme, we use collocation points and approximate solution of the problem under study by using MLS approximation. The MLS … Show more

“…Consider the Shrödinger equation (1.1) with initial condition (1.2) and boundary condition (1.3). This can be discretized by the following θ−weighted plan [15]:…”

Numerical Solution of Shrödinger Equations Based on the Meshless Methods

“…Consider the Shrödinger equation (1.1) with initial condition (1.2) and boundary condition (1.3). This can be discretized by the following θ−weighted plan [15]:…”

Numerical Solution of Shrödinger Equations Based on the Meshless Methods

“…In 2015, Feller used the Lévy Laplacian to solve a NOLVCHBVP [1]. In 2017, Mardani et al used the Moving Least Squares method for the nonlinear hyperbolic telegraph equation with variable coefficients [2]. Ashyralyev and Agirseven, in 2018, solved a NOLHBVP with a time delay [3].…”

The Galerkin-Implicit Method for Solving Nonlinear Variable Coefficients Hyperbolic Boundary Value Problem

“…In the works [8] optimal boundary control problem is considered for the nonlinear hyperbolic equation. In [7,9] solution of the nonlinear hyperbolic equations is investigated stimulated by the strong relation of such problems with different applications. In this work the problem of finding the coefficients of the nonlinear wave equation is reduced to the optimal control problem.…”

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