Ordered Rate Constitutive Theories for Non-Classical Thermoviscoelastic Fluids with Internal Rotation Rates

IF 1 4区数学 Applied Mathematics-A Journal of Chinese Universities Series B Pub Date : 2018-08-14 DOI:10.4236/AM.2018.98063

K. Surana, S. W. Long, J. Reddy

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引用次数: 5

Abstract

The paper presents constitutive theories for non-classical thermoviscoelastic fluids with dissipation and memory using a thermodynamic framework based on entirety of velocity gradient tensor. Thus, the conservation and the balance laws used in this work incorporate symmetric as well as antisymmetric part of the velocity gradient tensor. The constitutive theories derived here hold in coand contra-variant bases as well as in Jaumann rates and are derived using convected time derivatives of Green’s and Almansi strain tensors as well as the Cauchy stress tensor and its convected time derivatives in appropriate bases. The constitutive theories are presented in the absence as well as in the presence of the balance of moment of moments as balance law. It is shown that the dissipation mechanism and the fading memory in such fluids are due to stress rates as well as moment rates and their conjugates. The material coefficients are derived for the general forms of the constitutive theories based on integrity. Simplified linear (or quasi-linear) forms of the constitutive theories are also presented. Maxwell, Oldroyd-B and Giesekus constitutive models for non-classical thermoviscoelastic fluids are derived and are compared with those derived based on classical continuum mechanics. Both, compressible and incompressible thermoviscoelastic fluids are considered.

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具有内旋转速率的非经典热粘弹性流体的有序速率本构理论

本文采用基于速度梯度张量整体的热力学框架，提出了具有耗散和记忆的非经典热粘弹性流体的本构理论。因此，在这项工作中使用的守恒和平衡定律包含了速度梯度张量的对称和反对称部分。本文导出的本构理论适用于正变基和反变基以及Jaumann率，并使用格林应变张量和阿尔曼西应变张量的对流时间导数以及柯西应力张量及其在适当基中的对流时间导数导出。本构理论是在没有和存在作为平衡律的矩的平衡时提出的。结果表明，这种流体的耗散机制和记忆衰退是由应力速率、力矩速率及其共轭速率决定的。推导了基于完整性的本构理论的一般形式的材料系数。本构理论的简化线性(或拟线性)形式也被提出。推导了非经典热粘弹性流体的Maxwell、Oldroyd-B和Giesekus本构模型，并与经典连续介质力学的本构模型进行了比较。同时考虑了可压缩和不可压缩热粘弹性流体。

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来源期刊

Applied Mathematics-A Journal of Chinese Universities Series B MATHEMATICS, APPLIED-

自引率

10.00%

发文量

期刊介绍： Applied Mathematics promotes the integration of mathematics with other scientific disciplines, expanding its fields of study and promoting the development of relevant interdisciplinary subjects. The journal mainly publishes original research papers that apply mathematical concepts, theories and methods to other subjects such as physics, chemistry, biology, information science, energy, environmental science, economics, and finance. In addition, it also reports the latest developments and trends in which mathematics interacts with other disciplines. Readers include professors and students, professionals in applied mathematics, and engineers at research institutes and in industry. Applied Mathematics - A Journal of Chinese Universities has been an English-language quarterly since 1993. The English edition, abbreviated as Series B, has different contents than this Chinese edition, Series A.