Correction of high-order Lk approximation for subdiffusion
Abstract
The subdiffusion equations with a Caputo fractional derivative of order α ∈ (0,1) arise in a wide variety of practical problems, which is describing the transport processes, in the force-free limit, slower than Brownian diffusion. In this work, we derive the correction schemes of the Lagrange interpolation with degree k (k≤ 6) convolution quadrature, called Lk approximation, for the subdiffusion, which are easy to implement on variable grids. The key step of designing correction algorithm is to calculate the explicit form of the coefficients of Lk approximation by the polylogarithm function or Bose-Einstein integral. To construct a τ8 approximation of Bose-Einstein integral, the desired (k+1-α)th-order convergence rate can be proved for the correction Lk scheme with nonsmooth data, which is higher than kth-order BDFk method in [Jin, Li, and Zhou, SIAM J. Sci. Comput., 39 (2017), A3129--A3152; Shi and Chen, J. Sci. Comput., (2020) 85:28]. The numerical experiments with spectral method are given to illustrate theoretical results.
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