H3N3 Approximate Formulae for Typical Fractional Derivatives

doi:10.1007/s42967-024-00395-w

Communications on Applied Mathematics and Computation ›› 2025, Vol. 7 ›› Issue (6): 2485-2501.doi: 10.1007/s42967-024-00395-w

• ORIGINAL PAPERS • 上一篇

H3N3 Approximate Formulae for Typical Fractional Derivatives

Enyu Fan¹, Yaxuan Li², Qianlan Zhao²

1. School of Mathematical Sciences, Inner Mongolia University, Hohhot 010021, Inner Mongolia, China;
2. Department of Mathematics, Shanghai University, Shanghai 200444, China

收稿日期:2024-01-15 修回日期:2024-02-19 发布日期:2025-12-24
通讯作者: Enyu Fan, E-mail:fanenyumath@aliyun.com E-mail:fanenyumath@aliyun.com

H3N3 Approximate Formulae for Typical Fractional Derivatives

Enyu Fan¹, Yaxuan Li², Qianlan Zhao²

1. School of Mathematical Sciences, Inner Mongolia University, Hohhot 010021, Inner Mongolia, China;
2. Department of Mathematics, Shanghai University, Shanghai 200444, China

Received:2024-01-15 Revised:2024-02-19 Published:2025-12-24
Contact: Enyu Fan, E-mail:fanenyumath@aliyun.com E-mail:fanenyumath@aliyun.com

摘要/Abstract

摘要： The existing numerical approximation formulae for two kinds of typical fractional derivatives—the exponential Caputo and Caputo-Hadamard derivatives both of order $ \alpha \in (1,2) $ include L2, $ \hbox {L2}_1 $, H2N2, but their convergence orders are all less than 2. To obtain a higher accuracy convergence order, we construct H3N3 approximation formulae based on the H2N2 formulae of these two kinds of derivatives and the $ \hbox {H3N3-2}_\sigma $ formula of the Caputo derivative, determine their truncation errors, and show the coefficients’ properties. Simultaneously, we display the numerical examples which support the theoretical analysis.

关键词: Exponential Caputo derivative, Caputo-Hadamard derivative, H3N3 formula, Truncation error

Abstract: The existing numerical approximation formulae for two kinds of typical fractional derivatives—the exponential Caputo and Caputo-Hadamard derivatives both of order $ \alpha \in (1,2) $ include L2, $ \hbox {L2}_1 $, H2N2, but their convergence orders are all less than 2. To obtain a higher accuracy convergence order, we construct H3N3 approximation formulae based on the H2N2 formulae of these two kinds of derivatives and the $ \hbox {H3N3-2}_\sigma $ formula of the Caputo derivative, determine their truncation errors, and show the coefficients’ properties. Simultaneously, we display the numerical examples which support the theoretical analysis.

Key words: Exponential Caputo derivative, Caputo-Hadamard derivative, H3N3 formula, Truncation error

中图分类号:

26A33

Enyu Fan, Yaxuan Li, Qianlan Zhao. H3N3 Approximate Formulae for Typical Fractional Derivatives[J]. Communications on Applied Mathematics and Computation, 2025, 7(6): 2485-2501.

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H3N3 Approximate Formulae for Typical Fractional Derivatives

H3N3 Approximate Formulae for Typical Fractional Derivatives

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