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New formulas of the<scp>high‐order</scp>derivatives of<scp>fifth‐kind</scp>Chebyshev polynomials: Spectral solution of the<scp>convection–diffusion</scp>equation

W. M. Abd‐Elhameed, Y. H. Youssri

2021Numerical Methods for Partial Differential Equations20 citationsDOI

Abstract

Abstract This paper is dedicated to deriving novel formulae for the high‐order derivatives of Chebyshev polynomials of the fifth‐kind. The high‐order derivatives of these polynomials are expressed in terms of their original polynomials. The derived formulae contain certain terminating 4 F 3 (1) hypergeometric functions. We show that the resulting hypergeometric functions can be reduced in the case of the first derivative. As an important application—and based on the derived formulas—a spectral tau algorithm is implemented and analyzed for numerically solving the convection–diffusion equation. The convergence and error analysis of the suggested double expansion is investigated assuming that the solution of the problem is separable. Some illustrative examples are presented to check the applicability and accuracy of our proposed algorithm.

Topics & Concepts

MathematicsChebyshev polynomialsHypergeometric functionOrder (exchange)Jacobi polynomialsSpectral methodConvergence (economics)Chebyshev filterMathematical analysisApplied mathematicsOrthogonal polynomialsEconomic growthFinanceEconomicsFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsMathematical functions and polynomials
New formulas of the<scp>high‐order</scp>derivatives of<scp>fifth‐kind</scp>Chebyshev polynomials: Spectral solution of the<scp>convection–diffusion</scp>equation | Litcius