Novel numerical method for solving variable-order fractional differential equations with power, exponential and Mittag-Leffler laws

Solis-Perez J. E.; Gomez-Aguilar J. F.; Atangana A.

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Novel numerical method for solving variable-order fractional differential equations with power, exponential and Mittag-Leffler laws

机译：用电力，指数和Mittag-Leffler法律求解可变级分数微分方程的新型数值方法

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Variable-order differential operators can be employed as a powerful tool to modeling nonlinear fractional differential equations and chaotical systems. In this paper, we propose a new generalize numerical schemes for simulating variable-order fractional differential operators with power-law, exponential-law and Mittag-Leffler kernel. The numerical schemes are based on the fundamental theorem of fractional calculus and the Lagrange polynomial interpolation. These schemes were applied to simulate the chaotic financial system and memcapacitor-based circuit chaotic oscillator. Numerical examples are presented to show the applicability and efficiency of this novel method. (C) 2018 Elsevier Ltd. All rights reserved.

机译：可变级差分运算符可以用作建模非线性分数微分方程和乱性系统的强大工具。在本文中，我们提出了一种新的概括数字方案，用于模拟具有幂律，指数法和Mittag Leffler内核的可变量分数差分运算符。数值方案基于分数微积分和拉格朗日多项式插值的基本定理。应用这些方案来模拟混沌金融系统和基于Memcapacitor的电路混沌振荡器。提出了数值示例以显示这种新方法的适用性和效率。（c）2018年elestvier有限公司保留所有权利。

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《Chaos, Solitons and Fractals: Applications in Science and Engineering: An Interdisciplinary Journal of Nonlinear Science》 |2018年第2018期|共11页
作者
Solis-Perez J. E.; Gomez-Aguilar J. F.; Atangana A.;
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作者单位

Tecnol Nacl Mexico CENIDET Interior Internado Palmira S-N Cuernavaca 62490 Morelos Mexico;

Tecnol Nacl Mexico CONACyT CENIDET Interior Internado Palmira S-N Cuernavaca 62490 Morelos Mexico;

Univ Free State Fac Nat &

Agr Sci Inst Groundwater Studies ZA-9300 Bloemfontein South Africa;

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正文语种 eng
中图分类动力系统理论;
关键词
Variable-order fractional derivatives; Atangana-Toufik numerical scheme; Financial system; Memcapacitor-based circuit;

机译：可变性分数衍生物;Atangana-Toufik数值方案;金融系统;基于Memcapacitor的电路;

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1. Novel numerical method for solving variable-order fractional differential equations with power, exponential and Mittag-Leffler laws [J] . Solis-Perez J. E., Gomez-Aguilar J. F., Atangana A. Chaos, Solitons and Fractals: Applications in Science and Engineering: An Interdisciplinary Journal of Nonlinear Science . 2018,第期

机译：用电力，指数和Mittag-Leffler法律求解可变级分数微分方程的新型数值方法
2. Solving fractional differential equations of variable-order involving operators with Mittag-Leffler kernel using artificial neural networks [J] . C.J. Zú?iga-Aguilar, H.M. Romero-Ugalde, J.F. Gómez-Aguilar, Chaos, Solitons and Fractals: Applications in Science and Engineering: An Interdisciplinary Journal of Nonlinear Science . 2017,第期

机译：使用人工神经网络求解涉及Mittag-Leffler内核的可变顺序的分数微分方程
3. Numerical solution of variable-order fractional integro-partial differential equations via Sinc collocation method based on single and double exponential transformations [J] . Communications in Nonlinear Science and Numerical Simulation . 2020,第Mara期

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4. Numerical Simulations for Fitting Parameters of Linear and Logistic-Type Fractional-, Variable-Order Equations - Comparision of Methods [C] . Piotr Oziablo International conference on non-integer order calculus and its applications . 2020

机译：线性和逻辑型分数，可变阶方程拟合参数的数值模拟 - 方法比较
5. A novel numerical method for solving autonomous initial value problems of fractional order differential equations. [D] . Suthangkornkul, Peeradech. 2011

机译：一种求解分数阶微分方程自治初值问题的新型数值方法。
6. Neural minimization methods (NMM) for solving variable order fractional delay differential equations (FDDEs) with simulated annealing (SA) [O] . Amber Shaikh, M. Asif Jamal, Fozia Hanif, 2012

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7. A predator–prey model involving variable-order fractional differential equations with Mittag-Leffler kernel [O] . Aziz Khan, Hashim M. Alshehri, J. F. Gómez-Aguilar, 2021

机译：涉及具有Mittag Leffler内核的可变阶分形差分方程的捕食者 - 猎物模型

Novel numerical method for solving variable-order fractional differential equations with power, exponential and Mittag-Leffler laws

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