Journal
NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS
Volume 37, Issue 1, Pages 614-625Publisher
WILEY
DOI: 10.1002/num.22543
Keywords
Caputo fractional derivative; Crank-Nicolson method; finite differences theta-method; sub-diffusion equations
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This study presents a robust modification of Chebyshev theta-weighted Crank-Nicolson method for analyzing sub-diffusion equations in the Caputo fractional sense, with a focus on consistency, convergence, and stability analysis. By considering compact structures of sub-diffusion equations as prototype examples, the proposed method is more efficient in terms of CPU time, computational cost, and accuracy compared to existing methods.
This study presents a robust modification of Chebyshev theta-weighted Crank-Nicolson method for analyzing the sub-diffusion equations in the Caputo fractional sense. In order to solve the problem, by discretization of the sub-fractional diffusion equations using Taylor's expansion a linear system of algebraic equations that can be analyzed by numerical methods is presented. Furthermore, consistency, convergence, and stability analysis of the suggested method are discussed. In this framework, compact structures of sub-diffusion equations are considered as prototype examples. The main advantage of the proposed method is that, it is more efficient in terms of CPU time, computational cost and accuracy in comparing with the existing ones in open literature.
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