To the theory of bending and oscillations of three-layered plates with a compressible filler

The paper is devoted to improving the theory of bending and vibrations of three-layer plates with transverse compressible filler and thin outer bearing layers. For the outer layers, the Kirchhoff-Love hypothesis is accepted and the motion of their points is described by the equations of the theory o...

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Bibliographic Details
Published in:IOP conference series. Materials Science and Engineering 2020-06, Vol.869 (5), p.52037
Main Authors: Usarov, Makhamatali, Salokhiddinov, Abdulkhakim, Usarov, D M, Khazratkulov, Islomjon, Dremova, Nadejda
Format: Article
Language:English
Subjects:
Bending
Boundary conditions
Compressibility
Contact stresses
Equations of motion
Fillers
Hypotheses
Mathematical analysis
Thick plates
Thin films
Thin plates
Three dimensional bodies
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Summary:The paper is devoted to improving the theory of bending and vibrations of three-layer plates with transverse compressible filler and thin outer bearing layers. For the outer layers, the Kirchhoff-Love hypothesis is accepted and the motion of their points is described by the equations of the theory of thin plates relative to forces and moments. Unlikebearinglayers, a filler is considered as a three-dimensional body that does not obey any simplifying hypotheses. The equations of the bimoment theory of thick plates with respect to forces, moments and bimoments, created in the framework of the three-dimensional theory of elasticity, taking into account the nonlinearity of the distribution law of displacements and stresses over the thickness, are taken as the equations of motion of the filler. Expressions of forces, moments, and bimoments in the layers, as well as boundary conditions at the edges of a three-layer plate with respect to force factors are given. In the conjugate zones of the layers, the complete contact conditions for the continuity of displacements and stresses are set. An example is considered and numerical results are obtained.
ISSN:1757-8981
1757-899X
DOI:10.1088/1757-899X/869/5/052037