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Egorychev Oleg Aleksandrovich -
Moscow State University of Civil Engineering (MSUCE)
Doctor of Technical Sciences, Professor
8 (495) 320-43-02, Moscow State University of Civil Engineering (MSUCE), 26 Jaroslavskoe shosse, Moscow, 129337, Russia.
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Egorychev Oleg Olegovich -
Moscow State University of Civil Engineering (MSUCE)
Doctor of Technical Sciences, Professor
8 (495) 287-49-14, Moscow State University of Civil Engineering (MSUCE), 26 Jaroslavskoe shosse, Moscow, 129337, Russia;
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.
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Brendje Vladimir Vladislavovich -
Moscow State University of Civil Engineering (MSUCE)
Senior Lecturer
8 (499) 161-21-57, Moscow State University of Civil Engineering (MSUCE), 26 Jaroslavskoe shosse, Moscow, 129337, Russia;
This e-mail address is being protected from spambots. You need JavaScript enabled to view it
.
The article represents a new outlook at the boundary-value problem of natural vibrations of a homogeneous pre-stressed orthotropic plate-stripe. In the paper, the motion equation represents a new approximate hyperbolic equation (rather than a parabolic equation used in the majority of papers covering the same problem) describing the vibration of a homogeneous orthotropic plate-stripe. The proposed research is based on newly derived boundary conditions describing the pin-edge, rigid, and elastic (vertical) types of fixing, as well as the boundary conditions applicable to the unfixed edge of the plate. The paper contemplates the application of the Laplace transformation and a non-standard representation of a homogeneous differential equation with fixed factors. The article proposes a detailed representation of the problem of natural vibrations of a homogeneous orthotropic plate-stripe if rigidly fixed at opposite sides; besides, the article also provides frequency equations (no conclusions) describing the plate characterized by the following boundary conditions: rigid fixing at one side and pin-edge fixing at the opposite side; pin-edge fixing at one side and free (unfixed) other side; rigid fixing at one side and elastic fixing at the other side. The results described in the article may be helpful if applied in the construction sector whenever flat structural elements are considered. Moreover, specialists in solid mechanics and theory of elasticity may benefit from the ideas proposed in the article.
DOI: 10.22227/1997-0935.2012.2.11 - 14
References
- Egorychev O.O. Kolebanija ploskih elementov konstrukcij [Vibrations of Two-Dimensional Structural Elements]. Moscow, ASV, 2005, pp. 45—49.
- Arun K Gupta, Neeri Agarwal, Sanjay Kumar. Free transverse vibrations of orthotropic viscoelastic rectangular plate with continuously varying thickness and density// Institute of Thermomechanics AS CR, Prague, Czech Rep, 2010, Issue # 2.
- Filippov I.G., Cheban V.G. Matematicheskaja teorija kolebanij uprugih i vjazkouprugih plastin i sterzhnej [Mathematical Theory of Vibrations of Elastic and Viscoelastic Plates and Rods]. Kishinev, Shtinica, 1988, pp. 27—30.
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Egorychev Oleg Aleksandrovich -
Moscow State University of Civil Engineering (MSUCE)
Doctor of Technical Sciences, Professor, Moscow State University of Civil Engineering (MSUCE), 26 Yaroslavskoe shosse, Moscow, 129337, Russian Federation;
This e-mail address is being protected from spambots. You need JavaScript enabled to view it
.
-
Egorychev Oleg Olegovich -
Moscow State University of Civil Engineering (MSUCE)
Doctor of Technical Sciences, Professor
8 (495) 287-49-14, Moscow State University of Civil Engineering (MSUCE), 26 Jaroslavskoe shosse, Moscow, 129337, Russia;
This e-mail address is being protected from spambots. You need JavaScript enabled to view it
.
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Brende Vladimir Vladislavovich -
Moscow State University of Civil Engineering (MSUCE)
Senior Lecturer,
+7 (499) 161-21-57, Moscow State University of Civil Engineering (MSUCE), 26 Yaroslavskoe shosse, Moscow, 129337, Russian Federation;
This e-mail address is being protected from spambots. You need JavaScript enabled to view it
.
In the article, the authors present their new formulation of the problem of the boundary value of natural vibrations of a homogeneous pre-stressed orthotropic plate-strip in different boundary conditions. A new approximate hyperbolic (in contrast to most authors) equation of oscillations of a homogeneous orthotropic plate-strip is used in the paper in the capacity of an equation of motion. Besides, the authors propose their newly derived boundary conditions for a free edge of the plate. The authors employ the Laplace transformation and a non-standard representation of the general solution of homogeneous differential equations with constant coefficients. The authors also provide a detailed description of the problem of free vibrations of a homogeneous orthotropic plate-strip, if rigidly attached in the opposite sides. The results presented in this article may be applied in the areas of construction and machine building, wherever flat structural elements are used. In addition, professionals in mechanics of solid deformable body and elasticity theory may benefit from the findings presented in the article.
DOI: 10.22227/1997-0935.2012.7.26 - 30
References
- Uflyand Ya.S. Rasprostranenie voln pri poperechnykh kolebaniyakh sterzhney i plastin [Wave Propagation in the Event of Transverse Vibrations of Rods and Plates]. Prikladnaya matematika i mekhanika [Applied Mathematics and Mechanics]. 1948, vol. 12, no. 33, pp. 287—300.
- Lyav A. Matematicheskaya teoriya uprugosti [Mathematical Theory of Elasticity]. Moscow-Leningrad, ONTI Publ., 1935, 674 p.
- Egorychev O.O. Kolebaniya ploskikh elementov konstruktsiy [Vibrations of Flat Elements of Structures]. Moscow, ASV Publ., 2005, pp. 45—49.
- Egorychev O.A., Egorychev O.O., Brende V.V. Vyvod chastotnogo uravneniya sobstvennykh poperechnykh kolebaniy predvaritel’no napryazhennoy plastiny uprugo zakreplennoy po odnomu krayu i zhestko zakreplennoy po-drugomu [Derivation of a Frequency Equation of Natural Transverse Vibrations of a Pre-stressed Elastic Plate, If One Edge Is Fixed Rigidly and the Other One is Fixed Elastically]. Vestnik MGSU [Proceedings of Moscow State University of Civil Engineering]. 2010, no. 4, vol. 3, pp. 246—251.
- Filippov I.G., Cheban V.G. Matematicheskaya teoriya kolebaniy uprugikh i vyazkouprugikh plastin i sterzhney [Mathematical Theory of Vibrations of Elastic and Viscoelastic Plates and Rods]. Kishinev, Shtiintsa Publ., 1988, pp. 27—30.
- Gupta A.K., Aragval N., Kumar S. Svobodnye kolebaniya ortotropnoy vyazkouprugoy plastiny s postoyanno menyayushcheysya tolshchinoy i plotnost’yu [Free Transverse Vibrations of an Orthotropic Visco-Elastic Plate with Continuously Varying Thickness and Density]. Institute of Thermal Dynamics, Prague, Czech Republic, 2010, no. 2.
- Egorychev O.A., Egorychev O.O., Brende V.V. Sobstvennye poperechnye kolebaniya predvaritel’no napryazhennoy ortotropnoy plastinki-polosy uprugo zakreplennoy po odnomu krayu i svobodnoy po drugomu [Natural Transverse Vibrations of a Pre-stressed Orthotropic Plate, If One Edge Is Fixed Elastically and the Other One Is Free]. Vestnik MGSU [Proceedings of Moscow State University of Civil Engineering]. 2010, no. 4, vol. 3, pp. 252—258.
- Lol R. Poperechnye kolebaniya ortotropnykh neodnorodnykh pryamougol’nykh plastin s nepreryvno menyayushcheysya plotnost’yu [Transverse Vibrations of Orthotropic Non-homogeneous Rectangular Plates with Continuously Varying Density]. Indian University of Technology, 2002, no. 5.
- Egorychev O.A., Brende V.V. Sobstvennye kolebaniya odnorodnoy ortotropnoy plastiny [Natural Vibrations of a Homogeneous Orthotropic Plate]. Department of Industrial and Civil Engineering, 2010, no. 6, pp.
- Lekhnitskiy S.G. Teoriya uprugosti anizotropnogo tela [Theory of Elasticity of an Anisotropic Body]. Moscow, Nauka. Fizmatlit Publ., 1977.