High order numerical methods based on quadratic spline collocation method and averaged L1 scheme for the variable-order time fractional mobile/immobile diffusion equation
Abstract
In this paper, we consider the variable-order time fractional mobile/immobile diffusion (TF-MID) equation in two-dimensional spatial domain, where the fractional order α(t) satisfies 0<α*≤ α(t)≤ α*<1. We combine the quadratic spline collocation (QSC) method and the L1+ formula to propose a QSC-L1+ scheme. It can be proved that, the QSC-L1+ scheme is unconditionally stable and convergent with O(τ\3-α*-α(0),2\ + x2+ y2), where τ, x and y are the temporal and spatial step sizes, respectively. With some proper assumptions on α(t), the QSC-L1+ scheme has second temporal convergence order even on the uniform mesh, without any restrictions on the solution of the equation. We further construct a novel alternating direction implicit (ADI) framework to develop an ADI-QSC-L1+ scheme, which has the same unconditionally stability and convergence orders. In addition, a fast implementation for the ADI-QSC-L1+ scheme based on the exponential-sum-approximation (ESA) technique is proposed. Moreover, we also introduce the optimal QSC method to improve the spatial convergence to fourth-order. Numerical experiments are attached to support the theoretical analysis, and to demonstrate the effectiveness of the proposed schemes.
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