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A fully discrete spectral method for fractional Cattaneo equation based on Caputo–Fabrizo derivative
Author(s) -
Li Haonan,
Lü Shujuan,
Xu Tao
Publication year - 2019
Publication title -
numerical methods for partial differential equations
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.901
H-Index - 61
eISSN - 1098-2426
pISSN - 0749-159X
DOI - 10.1002/num.22332
Subject(s) - mathematics , discretization , legendre polynomials , fractional calculus , derivative (finance) , mathematical analysis , norm (philosophy) , convergence (economics) , stability (learning theory) , machine learning , political science , computer science , financial economics , law , economics , economic growth
Recently Caputo and Fabrizio introduced a new derivative with fractional order without singular kernel. The derivative can be used to describe the material heterogeneities and the fluctuations of different scales. In this article, we derived a new discretization of Caputo–Fabrizio derivative of order α (1 <  α  < 2) and applied it into the Cattaneo equation. A fully discrete scheme based on finite difference method in time and Legendre spectral approximation in space is proposed. The stability and convergence of the fully discrete scheme are rigorously established. The convergence rate of the fully discrete scheme in H 1 norm is O ( τ 2  +  N 1− m ), where τ , N and m are the time‐step size, polynomial degree and regularity in the space variable of the exact solution, respectively. Furthermore, the accuracy and applicability of the scheme are confirmed by numerical examples to support the theoretical results.

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