A chebyshev-laguerre-gauss-radau collocation scheme for solving a time fractional sub-diffusion equation on a semi-infinite domain
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Date
2015
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The Publishing House of the Romanian Academy
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Abstract
We propose a new efficient spectral collocation method for solving a time fractional sub-diffusion
equation on a semi-infinite domain. The shifted Chebyshev-Gauss-Radau interpolation method is
adapted for time discretization along with the Laguerre-Gauss-Radau collocation scheme that is used
for space discretization on a semi-infinite domain. The main advantage of the proposed approach is
that a spectral method is implemented for both time and space discretizations, which allows us to
present a new efficient algorithm for solving time fractional sub-diffusion equations
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Keywords
Time Fractional Sub-Diffusion Equation, Semi-Infinite Domain, Chebyshev-Gauss-Radau Collocation Scheme, Caputo Derivatives
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Citation
Bhrawy, A.H...et al. (2016). A chebyshev-laguerre-gauss-radau collocation scheme for solving a time fractional sub-diffusion equation on a semi-infinite domain. Proceedings Of The Romanian Academy Series A-Mathematics Physics Technical Science Information Science, 16(4), 490-498.
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Proceedings Of The Romanian Academy Series A-Mathematics Physics Technical Science Information Science
Volume
16
Issue
4
Start Page
490
End Page
498