Complex order fractional derivatives in viscoelasticity

Atanackovic Teodor M.; Konjik Sanja; Pilipovic Stevan; Zorica Dusan

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Complex order fractional derivatives in viscoelasticity

机译：粘弹性的复数阶分数导数

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We introduce complex order fractional derivatives in models that describe viscoelastic materials. This cannot be carried out unrestrictedly, and therefore we derive, for the first time, real valued compatibility constraints, as well as physical constraints that lead to acceptable models. As a result, we introduce a new form of complex order fractional derivative. Also, we consider a fractional differential equation with complex derivatives, and study its solvability. Results obtained for stress relaxation and creep are illustrated by several numerical examples.

机译：我们在描述粘弹性材料的模型中引入复数阶分数导数。这不能不受限制地执行，因此，我们首次得出了实际价值的兼容性约束以及导致可接受模型的物理约束。结果，我们引入了一种新形式的复数阶分数导数。另外，我们考虑具有复数导数的分数阶微分方程，并研究其可解性。几个数值示例说明了应力松弛和蠕变获得的结果。

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来源
《Mechanics of time-dependent materials》 |2016年第2期|共21页
作者
Atanackovic Teodor M.; Konjik Sanja; Pilipovic Stevan; Zorica Dusan;
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正文语种 eng
中图分类工程材料学;
关键词
Real and complex order fractional derivatives; Constitutive equations; The Laplace transform; The Fourier transform; Thermodynamical restrictions;

机译：实阶和复阶分数阶导数;本构方程;Laplace变换;Fourier变换;热力学约束;

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1. Analysis of Complex Modal Characteristics of Fractional Derivative Viscoelastic Rotating Beams [J] . Lu Tianle, Wang Zhongmin, Liu Dongdong Shock and vibration . 2019,第PTa10期

机译：分数衍生粘弹性旋转梁复杂模态特性分析
2. Complex order fractional derivatives in viscoelasticity [J] . Atanackovic Teodor M., Konjik Sanja, Pilipovic Stevan, Mechanics of time-dependent materials . 2016,第2期

机译：粘弹性的复数阶分数导数
3. Complex step derivative approximation of consistent tangent operators for viscoelasticity based on fractional calculus [J] . Huerkamp Andre, Tanaka Masato, Kaliske Michael Computational Mechanics: Solids, Fluids, Fracture Transport Phenomena and Variational Methods . 2015,第6期

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4. Complex plane analysis of fractional derivative model and its use for parameter determination of viscoelastic material [C] . Y L Yin, Z H Yang, M L Shi International Conference on Manufacturing Technology, Materials and Chemical Engineering . 2019

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5. Fractional derivatives, fractional differential equations, and their numerical approximation [D] . Hatcher, Christopher 2013

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6. An Inverse Power-Law Distribution of Molecular Bond Lifetimes Predicts Fractional Derivative Viscoelasticity in Biological Tissue [O] . Bradley M. Palmer, Bertrand C.W. Tanner, Michael J. Toth, 2013

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7. Analysis of Complex Modal Characteristics of Fractional Derivative Viscoelastic Rotating Beams [O] . Tianle Lu, Zhongmin Wang, Dongdong Liu 2019

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8. Comparison of Fractional Order Time Derivative Models of the Viscoelastic StressRelations in Thermorheologically Complex Materials [R] . Chambers, V. B. 1991

机译：热流变复合材料中粘弹性应力关系的分数阶时间导数模型的比较

Complex order fractional derivatives in viscoelasticity

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