A new class of spectral methods for solving two-point boundary value problems for linear ordinary differential equations is presented in the paper. Although these methods are based on trigonometric functions, they can be used for solving periodic as well as nonperiodic problems. Instead of using basis functions periodic on a given interval −1,1, we use functions periodic on a wider interval. The numerical solution of the given problem is sought in terms of the half-range Chebyshev-Fourier (HCF) series, a reorganization of the classical Fourier series using half-range Chebyshev polynomials of the first and second kind which were first introduced by Huybrechs (2010) and further analyzed by Orel and Perne (2012). The numerical solution is cons...
This study investigates the eigenvalues of regular Sturm-Liouville problems with Chebyshev collocati...
The advection-diffusion equation is approximated by Chebyshev and Legendre spectral and pseudo-spect...
Spectral integration is a method for solving linear boundary value problems which uses the Chebyshev...
Abstract. Algorithms and underlying mathematics are presented for numerical computation with periodi...
In this paper, we introduce a fully spectral solution for the partial differential equation ut + uux...
We obtain exponentially accurate Fourier series for non-periodic functions on the interval [-1,1] by...
This paper reports a new spectral collocation method for numerically solving two-dimensional biharm...
We propose a pseudospectral hybrid algorithm to approximate the so-lution of partial differential eq...
Spectral methods can solve elliptic partial differential equations (PDEs) numerically with errors bo...
We address two aspects in the approximation of non-periodic functions: spectral collocation and func...
AbstractWe are concerned with linear and nonlinear multi-term fractional differential equations (FDE...
AbstractIn solving semilinear initial boundary value problems with prescribed non-periodic boundary ...
In solving semilinear initial boundary value problems with prescribed non-periodic boundary conditio...
Abstract In this paper, we solve a system of fractional differential equations within a fractional d...
“Domain truncation” is the simple strategy of solving problems on yε [-∞, ∞] by using a large but fi...
This study investigates the eigenvalues of regular Sturm-Liouville problems with Chebyshev collocati...
The advection-diffusion equation is approximated by Chebyshev and Legendre spectral and pseudo-spect...
Spectral integration is a method for solving linear boundary value problems which uses the Chebyshev...
Abstract. Algorithms and underlying mathematics are presented for numerical computation with periodi...
In this paper, we introduce a fully spectral solution for the partial differential equation ut + uux...
We obtain exponentially accurate Fourier series for non-periodic functions on the interval [-1,1] by...
This paper reports a new spectral collocation method for numerically solving two-dimensional biharm...
We propose a pseudospectral hybrid algorithm to approximate the so-lution of partial differential eq...
Spectral methods can solve elliptic partial differential equations (PDEs) numerically with errors bo...
We address two aspects in the approximation of non-periodic functions: spectral collocation and func...
AbstractWe are concerned with linear and nonlinear multi-term fractional differential equations (FDE...
AbstractIn solving semilinear initial boundary value problems with prescribed non-periodic boundary ...
In solving semilinear initial boundary value problems with prescribed non-periodic boundary conditio...
Abstract In this paper, we solve a system of fractional differential equations within a fractional d...
“Domain truncation” is the simple strategy of solving problems on yε [-∞, ∞] by using a large but fi...
This study investigates the eigenvalues of regular Sturm-Liouville problems with Chebyshev collocati...
The advection-diffusion equation is approximated by Chebyshev and Legendre spectral and pseudo-spect...
Spectral integration is a method for solving linear boundary value problems which uses the Chebyshev...