Space-time spectral method for the Cattaneo equation with time fractional derivative

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摘要

This paper introduces a high-order accurate numerical method for solving the Cattaneo equation with time fractional derivative. It is based on the Galerkin–Legendre spectral method in space and the Chebyshev collocation method in time. Arbitrarily high-order accurate can be made in both space and time. Optimal priori error bound of the semi-discrete method and the stability and convergence of the full-discrete method are strictly given. Extensive experimental results confirm the theoretical claims of this method in both space and time.

论文关键词:Space-time spectral method,Cattaneo equation,Galerkin–Legendre spectral method,Spectral collocation scheme,Error estimates

论文评审过程:Revised 17 November 2018, Accepted 26 December 2018, Available online 11 January 2019, Version of Record 11 January 2019.

论文官网地址:https://doi.org/10.1016/j.amc.2018.12.050