Finite Element Methods Based on Two Families of Second-Order Numerical Formulas for the Fractional Cable Model with Smooth Solutions

Yin, Baoli; Liu, Yang; Li, Hong; Zhang, Zhimin

doi:10.1007/s10915-020-01258-1

Cited by 29 publications

(8 citation statements)

References 39 publications

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“…For fractional calculus equations, one generally can not get the solution in closed form, thus different numerical methods have been proposed to efficiently obtain the approximate solution, see [2,5,7,8,10,20,21,24,25,31,38,41,43,49]. As is well known that the solution of fractional differential equations shows some singularity at the initial node, different techniques were employed to restore the optimal convergence rate, see [15,23,26,27,40,42,44,45,47]. For equations with distributed order calculus, things seem worse as the distributed order calculus is a natural generalization of the fractional calculus and hence is more complicated.…”

Section: Baoli Yin Yang Liu Hong LI and Zhimin Zhangmentioning

confidence: 99%

“…The starting part h α s j=1 w n,j f (jh) in (5) plays an essential role to improve the error accuracy of the formula for those f with initial singularity, and hence can be omitted provided f is smooth. For the calculation of the starting weights w n,j , we refer interested readers to [27,44]. Some well studied CQ methods with (α, ξ) satisfying ( 7) and ( 8) include (see [27,46]),…”

mentioning

confidence: 99%

“…when conducting their numerical experiments (see [6,11,34]), we first explore the technique of adding starting part for solutions having the structure as (44), and for simplicity, we further assume…”

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confidence: 99%

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Approximation methods for the distributed order calculus using the convolution quadrature

Yin¹,

Liu²,

Li³

et al. 2021

Discrete &Amp; Continuous Dynamical Systems - B

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In this article we generalize the convolution quadrature (CQ) method, which aims at approximating the fractional calculus, to the case for the distributed order calculus. Our method is a natural expansion that the approximation formulas, convergence results and correction technique reduce to the cases for the CQ method if the weight function µ(α) is defined by δ(α − α 0 ). Further, we explore a new structure of the solution of an ODE with the distributed order fractional derivative, which differs from those of the solutions of traditional fractional ODEs, and propose a new correction technique for this new structure to restore the optimal convergence rate. Numerical tests with smooth and nonsmooth solutions confirm our theoretical results and the efficiency of our correction technique.

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Section: Baoli Yin Yang Liu Hong LI and Zhimin Zhangmentioning

confidence: 99%

mentioning

confidence: 99%

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Approximation methods for the distributed order calculus using the convolution quadrature

Yin¹,

Liu²,

Li³

et al. 2021

Discrete &Amp; Continuous Dynamical Systems - B

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“…Zhao et al [47] presented a fully discrete L1 finite element method for multiterm time fractional diffusion equation with constant diffusivity, and a superconvergence result for H 1 -norm estimate was obtained. Yin et al [42] presented two families of novel fractional θ -methods to solve the fractional cable model, and an optimal convergence result with O(τ 2 + h k+1 ) for smooth solutions was obtained. Syed et al [26] proposed a homotopy analysis method for the space-time fractional Korteweg-de Vries (KdV) equation.…”

Section: Introductionmentioning

confidence: 99%

Superconvergence of a finite element method for the time-fractional diffusion equation with a time-space dependent diffusivity

2020

Adv Differ Equ

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In this work, a time-fractional diffusion problem with a time-space dependent diffusivity is considered. The solution of such a problem has a weak singularity at the initial time $t=0$ t = 0 . Based on the L1 scheme in time on a graded mesh and the conforming finite element method in space on a uniform mesh, the fully discrete L1 conforming finite element method (L1 FEM) of a time-fractional diffusion problem is investigated. The error analysis is based on a nonstandard discrete Gronwall inequality. The final superconvergence result shows that an optimal grading of the temporal mesh should be selected as $r\geq (2-\alpha )/\alpha $ r ≥ ( 2 − α ) / α . Numerical results confirm that our analysis is sharp.

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“…Fractional partial differential equations (FPDEs) have received extensive attentions by more and more scholars, and have been widely applied in many fields of science and engineering [1,2]. Many practical problems can be portrayed very well by the some FPDEs, such as fractional (reaction) diffusion equations [3][4][5][6][7][8][9][10][11][12], fractional Allen-Cahn equations [13][14][15], fractional Cable equations [16][17][18], and fractional mobile/immobile transport equations [19][20][21]. In the past few decades, a large number of numerical methods [22][23][24] have been proposed and used to solve the FPDEs, which have achieved excellent theoretical and numerical results.…”

Section: Introductionmentioning

confidence: 99%

A Crank–Nicolson Finite Volume Element Method for Time Fractional Sobolev Equations on Triangular Grids

Zhao

Fang

et al. 2020

Mathematics

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In this paper, a finite volume element (FVE) method is proposed for the time fractional Sobolev equations with the Caputo time fractional derivative. Based on the L1-formula and the Crank–Nicolson scheme, a fully discrete Crank–Nicolson FVE scheme is established by using an interpolation operator Ih*. The unconditional stability result and the optimal a priori error estimate in the L2(Ω)-norm for the Crank–Nicolson FVE scheme are obtained by using the direct recursive method. Finally, some numerical results are given to verify the time and space convergence accuracy, and to examine the feasibility and effectiveness for the proposed scheme.

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Finite Element Methods Based on Two Families of Second-Order Numerical Formulas for the Fractional Cable Model with Smooth Solutions

Cited by 29 publications

References 39 publications

Approximation methods for the distributed order calculus using the convolution quadrature

Approximation methods for the distributed order calculus using the convolution quadrature

Superconvergence of a finite element method for the time-fractional diffusion equation with a time-space dependent diffusivity

A Crank–Nicolson Finite Volume Element Method for Time Fractional Sobolev Equations on Triangular Grids

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