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MECHANICS
Geometric modeling of a shape of parallelogram plates in a problem of free vibrations using conformal radii
A. A. Chernyaev Orel State University, Orel, Russian
Federation
Abstract:
The paper considers a method of geometric modeling applied when solving basic twodimensional problems of the theory of elasticity and structural mechanics, in particular the applied problems of engineering. The subject of this study is vibrations of thin elastic parallelogram plates of constant thickness. To determine a basic frequency of vibrations, the interpolation method based on the geometric characteristic of the shape of plates (membrane, cross sections of a rod) is proposed. This characteristic represents a ratio of interior and exterior conformal radii of the plate. As is known from the theory of conformal mappings, conformal radii are those obtained by mapping of a plate onto the interior and exterior of a unit disk.
The paper presents basic terms, tables, and formulas related to the considered geometric method with a comparative analysis of the curve diagrams obtained using various interpolation formulas. The original computer program is also developed.
The main advantage of the proposed method of determining the basic frequency of plate vibrations is a graphic representation of results that allows one to accurately determine the required solution on the graph among the other solutions corresponding to the considered case of parallelogram plates. Although there are many known approximate approaches, which are used to solve the considered problems, only geometric modeling technique based on the conformal radii ratio gives such an opportunity.
Keywords:
geometric modeling, parallelogram plates, free vibrations, conformal radii.
Received: 10.09.2019
Citation:
A. A. Chernyaev, “Geometric modeling of a shape of parallelogram plates in a problem of free vibrations using conformal radii”, Vestn. Tomsk. Gos. Univ. Mat. Mekh., 2021, no. 70, 143–159
Linking options:
https://www.mathnet.ru/eng/vtgu846 https://www.mathnet.ru/eng/vtgu/y2021/i70/p143
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Abstract page: | 59 | Full-text PDF : | 59 | References: | 17 |
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