双重孔隙粘弹性材料线性耦合理论中的稳态振动问题

IF 1.1 4区 工程技术 Q3 MATERIALS SCIENCE, CHARACTERIZATION & TESTING
M. Svanadze
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引用次数: 4

摘要

本文考虑了双重孔隙粘弹性材料的线性耦合理论,研究了稳态振动的基本边值问题。事实上,在一开始,就提出了运动方程组和稳态振动方程组。然后,建立了Green恒等式,并证明了定常振动边值问题经典解的唯一性定理。构造了稳定振动方程组的基本解,给出了势(表面和体积)的基本性质。最后,利用势法(边界积分方程法)和奇异积分方程理论,证明了上述BVP经典解的存在性定理。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Problems of steady vibrations in the coupled linear theory of double-porosity viscoelastic materials
In the present paper the coupled linear theory of double-porosity viscoelastic materials is considered and the basic boundary value problems (BVPs) of steady vibrations are investigated. Indeed, in the beginning, the systems of equations of motion and steady vibrations are presented. Then, Green’s identities are established and the uniqueness theorems for classical solutions of the BVPs of steady vibrations are proved. The fundamental solution of the system of steady vibration equations is constructed and the basic properties of the potentials (surface and volume) are given. Finally, the existence theorems for classical solutions of the above mentioned BVPs are proved by using the potential method (the boundary integral equations method) and the theory of singular integral equations.
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来源期刊
Archives of Mechanics
Archives of Mechanics 工程技术-材料科学:表征与测试
CiteScore
1.40
自引率
12.50%
发文量
0
审稿时长
>12 weeks
期刊介绍: Archives of Mechanics provides a forum for original research on mechanics of solids, fluids and discrete systems, including the development of mathematical methods for solving mechanical problems. The journal encompasses all aspects of the field, with the emphasis placed on: -mechanics of materials: elasticity, plasticity, time-dependent phenomena, phase transformation, damage, fracture; physical and experimental foundations, micromechanics, thermodynamics, instabilities; -methods and problems in continuum mechanics: general theory and novel applications, thermomechanics, structural analysis, porous media, contact problems; -dynamics of material systems; -fluid flows and interactions with solids. Papers published in the Archives should contain original contributions dealing with theoretical, experimental, or numerical aspects of mechanical problems listed above. The journal publishes also current announcements and information about important scientific events of possible interest to its readers, like conferences, congresses, symposia, work-shops, courses, etc. Occasionally, special issues of the journal may be devoted to publication of all or selected papers presented at international conferences or other scientific meetings. However, all papers intended for such an issue are subjected to the usual reviewing and acceptance procedure.
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