Symmetric duality for left and right Riemann–Liouville and Caputo fractional differences

Thabet Abdeljawad; Delfim F.M. Torres

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Symmetric duality for left and right Riemann–Liouville and Caputo fractional differences

机译：Riemann-Liouville和Caputo分数差分的左右对称对偶

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摘要

A discrete version of the symmetric duality of Caputo–Torres, to relate left and right Riemann–Liouville and Caputo fractional differences, is considered. As a corollary, we provide an evidence to the fact that in case of right fractional differences, one has to mix between nabla and delta operators. As an application, we derive right fractional summation by parts formulas and left fractional difference Euler–Lagrange equations for discrete fractional variational problems whose Lagrangians depend on right fractional differences.

机译：考虑了Caputo-Torres对称对偶的离散形式，以联系左右黎曼-Liouville和Caputo分数差异。作为推论，我们为以下事实提供了证据：在正确的分数差异的情况下，必须在nabla和delta运算符之间混合使用。作为应用，我们针对零件的拉格朗日依赖于右分数差的离散分数变分问题，通过零件公式和左分数差Euler–Lagrange方程得出右分数求和。

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《Arab Journal of Mathematical Sciences》 |2017年第2期|共16页
作者
Thabet Abdeljawad; Delfim F.M. Torres;
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中图分类数学;
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4. Objectivity Lost when Riemann-Liouville or Caputo Fractional Order Derivatives Are Used [C] . Agneta M. Balint, Stefan Balint TM 18 Physics Conference . 2019

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5. Qualitative Theory of Riemann-Liouville Fractional Differential Equations [D] . Denton, Zachary 2012

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6. Data for numerical solution of Caputos and Riemann–Liouvilles fractional differential equations [O] . David E. Betancur-Herrera, Nicolas Muñoz-Galeano 2020

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7. Symmetric duality for left and right Riemann–Liouville and Caputo fractional differences [O] . Thabet Abdeljawad, Delfim F.M. Torres 2017

机译：左右Riemann-Liouville和Caputo分数差的对称对偶性

Symmetric duality for left and right Riemann–Liouville and Caputo fractional differences

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