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Pseudospectral methods for nonlinear pendulum equations pendulum). The numerical solution that was used for our research suitably the pseudospectral methods
A new algorithm used the Chebyshev pseudospectral method to solve the nonlinear second-order Lienard differential equations. This algorithm based on the pseudospectral method using the Chebyshev differentiation matrix (CPM). In this paper
Using differentiation matrices for pseudospectral method solve Duffing oscillatorUsing differentiation matrices for pseudospectral method solve Duffing oscillator
PSEUDOSPECTRAL METHOD FOR SECOND-ORDER AUTONOMOUS NONLINEAR DIFFERENTIAL EQUATIONS on the range [-1, 1] with the boundary values u[-1] and u[1] provided. We use the pseudospectral method based
Chebyshev Pseudospectral Method Computing Eigenvalues for Ordinary Differential Equations with Homogeneous Dirichlet Boundary Condition condition was considered. The Chebyshev pseudospectral method (CPM) was used for the problem of eigenvalues
Multistage collocation pseudo-spectral method for the solution of the first order linear ODEMultistage collocation pseudo-spectral method for the solution of the first order linear ODE
Chebyshev pseudospectral method finds approximate solutions of the Mathieu's equations-point boundary value on the range [-1, 1] and the given boundary values. We used the Chebyshev pseudospectral
Numerical solution for the Schrodinger equation with potential in graphene structures, we used the pseudospectral method basing on the Chebyshev-Gauss-Lobatto grid to determine
ПСЕВДОСПЕКТРАЛЬНЫЙ МЕТОД В ПРИЛОЖЕНИИ К РЕШЕНИЮ ДИФФЕРЕНЦИАЛЬНОГО УРАВНЕНИЯ БЕССЕЛЯpseudospectral methods
PSEUDOSPECTRAL METHOD IN THE APPLICATION TO THE SOLUTION BESSEL DIFFERENTIAL EQUATION. In particular we consider spectral and pseudospectral methods based on expansions in Chebyshev polinomials at a
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