Spectral method for solving the equal width equation based on Chebyshev polynomials

accuracy of the spatial discretization (global errors in the range 10 Ϫ9 -10 Ϫ11 ) is maintained while allowing for large A spectral discretization of the equal width equation (EWE) is presented. The method is shown to be convergent and nonlinearly stepsizes. stable. Time-stepping is performed with

The generalized equal width (GEW) equation is solved numerically by the Petrov-Galerkin method using a linear hat function as the test function and a quadratic B-spline function as the trial function. Product approximation has been used in this method. A linear stability analysis of the scheme shows

We present a new iterative Chebyshev spectral method for solving the elliptic equation \(\nabla \cdot(\sigma \nabla u)=f\). We rewrite the equation in the form of a Poisson's equation \(\nabla^{2} u=(f-\nabla u \cdot \nabla \sigma) / \sigma\). In each iteration we compute the right-hand side terms f