Add to ORKGWe present a spectral method for one-sided linear fractional integral equations on a closed interval that achieves exponentially fast convergence for a variety of equations, including ones with irrational order, multiple fractional orders, non-trivial variable coefficients, and initial-boundary conditions. The method uses an orthogonal basis that we refer to as Jacobi fractional polynomials, which are obtained from an appropriate change of variable in weighted classical Jacobi polynomials. New algorithms for building the matrices used to represent fractional integration operators are presented and compared. Even though these algorithms are unstable and require the use of high-precision computations, the spectral method nonetheless yields we...
Abstract. In this paper, we consider spectral approximation of fractional differential equations (FD...
This paper is concerned with deriving an operational matrix of fractional-order integration of Fibon...
In this paper, we extend the idea of pseudo spectral method to approximate solution of time fraction...
We present a spectral method for one-sided linear fractional integral equations on a closed interval...
A fast algorithm (linear in the degrees of freedom) for the solution of linear variable-coefficient ...
Recently, operational matrices were adapted for solving several kinds of fractional differential equ...
We develop spectral collocation methods for fractional differential equations with variable order wi...
We generalize existing Jacobi--Gauss--Lobatto collocation methods for variable-order fractional diff...
In this article, we construct a numerical technique for solving the first and second kinds of Abel’s...
In this paper, a nonpolynomial-based spectral collocation method and its well-conditioned variant ar...
In this paper, we derive a spectral collocation method for solving fractional-order integro-differen...
In this paper, the shifted Jacobi spectral-Galerkin method is introduced to deal with fractional ord...
Herein, two numerical algorithms for solving some linear and nonlinear fractional-order differential...
Abstract. In this paper, we consider spectral approximation of fractional differential equations (FD...
In this article, we find the solutions to fractional Volterra-type integral equation nonlinear syste...
Abstract. In this paper, we consider spectral approximation of fractional differential equations (FD...
This paper is concerned with deriving an operational matrix of fractional-order integration of Fibon...
In this paper, we extend the idea of pseudo spectral method to approximate solution of time fraction...
We present a spectral method for one-sided linear fractional integral equations on a closed interval...
A fast algorithm (linear in the degrees of freedom) for the solution of linear variable-coefficient ...
Recently, operational matrices were adapted for solving several kinds of fractional differential equ...
We develop spectral collocation methods for fractional differential equations with variable order wi...
We generalize existing Jacobi--Gauss--Lobatto collocation methods for variable-order fractional diff...
In this article, we construct a numerical technique for solving the first and second kinds of Abel’s...
In this paper, a nonpolynomial-based spectral collocation method and its well-conditioned variant ar...
In this paper, we derive a spectral collocation method for solving fractional-order integro-differen...
In this paper, the shifted Jacobi spectral-Galerkin method is introduced to deal with fractional ord...
Herein, two numerical algorithms for solving some linear and nonlinear fractional-order differential...
Abstract. In this paper, we consider spectral approximation of fractional differential equations (FD...
In this article, we find the solutions to fractional Volterra-type integral equation nonlinear syste...
Abstract. In this paper, we consider spectral approximation of fractional differential equations (FD...
This paper is concerned with deriving an operational matrix of fractional-order integration of Fibon...
In this paper, we extend the idea of pseudo spectral method to approximate solution of time fraction...