Contact Problems for Two Stamps and a New Type of Crack Model

IF 0.6 4区 物理与天体物理 Q4 MECHANICS
V. A. Babeshko, O. V. Evdokimova, O. M. Babeshko, M. V. Zaretskaya, V. S. Evdokimov
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Abstract

In this work, for the first time, an exact solution of the contact problem of interaction with a multilayer base of two semi-infinite stamps, the ends of which are parallel to each other, is constructed. The stamps are assumed to be absolutely rigid, and the distance between them can have any finite value. The task is an important stage in the algorithm for constructing models of a new type of crack in materials of different rheologies. The mechanism of destruction of the medium by cracks of a new type is radically different from the mechanism of destruction of the medium by Griffiths cracks, and has so far been little studied. Griffiths formed his cracks with a smooth border as a result of compression from the sides of an elliptical cavity in the plate. Cracks of a new type have a piecewise smooth border, resulting from the replacement of an ellipse with a rectangle compressed from the sides. The problem considered in this article can be considered as the result of the formation of a new type of crack with absolutely rigid banks and a deformable lower boundary. Thanks to it, after the solution, it becomes possible to switch to deformable stamps and a crack of a new type in the rheological medium. The solution of this problem turned out to be possible due to the construction of exact solutions of the Wiener–Hopf integral equations on a finite segment. This paper shows how the solution of one of the previously unsolved problems allows us to investigate and solve exactly other problems and to identify previously unknown properties and resonances. As a result of constructing an exact solution to the problem, the fact that the solution of dynamic contact problems for stamp systems is not unique was confirmed and a dispersion equation for finding resonant frequencies was constructed.

两个印章的接触问题和一种新型裂纹模型
摘要 在这项工作中,首次构建了两个半无限邮票(其两端相互平行)与多层底座相互作用的接触问题的精确解。假定这两个印章是绝对刚性的,它们之间的距离可以是任意有限值。这项任务是在不同流变性材料中构建新型裂缝模型算法的重要阶段。新型裂缝对介质的破坏机理与格里菲斯裂缝对介质的破坏机理截然不同,而且迄今为止研究甚少。格里菲斯裂缝是由于板中椭圆形空腔的两侧受到挤压而形成的,裂缝边缘光滑。新型裂缝具有片状光滑边界,这是由于从侧面压缩的矩形取代了椭圆形。本文所考虑的问题可以看作是一种新型裂缝的形成过程,这种裂缝具有绝对刚性的两岸和可变形的下边界。有了它,在求解之后,就有可能切换到流变介质中的可变形印章和新型裂缝。由于在有限段上构建了维纳-霍普夫积分方程的精确解,该问题的求解成为可能。本文展示了如何通过解决以前未解决的问题之一,来精确研究和解决其他问题,并确定以前未知的特性和共振。由于构建了该问题的精确解,证实了邮票系统动态接触问题的解并非唯一,并构建了用于寻找共振频率的频散方程。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Doklady Physics
Doklady Physics 物理-力学
CiteScore
1.40
自引率
12.50%
发文量
12
审稿时长
4-8 weeks
期刊介绍: Doklady Physics is a journal that publishes new research in physics of great significance. Initially the journal was a forum of the Russian Academy of Science and published only best contributions from Russia in the form of short articles. Now the journal welcomes submissions from any country in the English or Russian language. Every manuscript must be recommended by Russian or foreign members of the Russian Academy of Sciences.
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