Hereditariness and non-locality in wave propagation modeling

IF 0.7 Q4 MECHANICS Theoretical and Applied Mechanics Pub Date : 2020-01-01 DOI:10.2298/tam200116005z
D. Zorica
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引用次数: 1

Abstract

The classical wave equation is generalized within the framework of fractional calculus in order to account for the memory and non-local effects that might be material features. Both effects are included in the constitutive equation, while the equation of motion of the deformable body and strain are left unchanged. Memory effects in viscoelastic materials are modeled through the distributed-order fractional constitutive equation that generalizes all linear models having differentiation orders up to order one. The microlocal approach in analyzing singularity propagation is utilized in the case of viscoelastic material described by the fractional Zener model, as well as in the case of two non-local models: non-local Hookean and fractional Eringen.
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波传播模型中的遗传与非定域性
经典波动方程在分数阶微积分的框架内进行了推广,以解释可能是材料特征的记忆和非局部效应。这两种影响都包含在本构方程中,而变形体的运动方程和应变保持不变。粘弹性材料中的记忆效应是通过分布阶分数本构方程来建模的,该方程推广了所有微分阶为一阶的线性模型。对于分数阶齐纳模型描述的粘弹性材料,以及非局部Hookean和分数阶Eringen两种非局部模型,采用微局部方法分析奇异传播。
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来源期刊
CiteScore
0.90
自引率
0.00%
发文量
4
审稿时长
32 weeks
期刊介绍: Theoretical and Applied Mechanics (TAM) invites submission of original scholarly work in all fields of theoretical and applied mechanics. TAM features selected high quality research articles that represent the broad spectrum of interest in mechanics.
期刊最新文献
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