Formulation of Problems in the General Kirchhoff—Love Theory of Inhomogeneous Anisotropic Plates

Formulation of Problems in the General Kirchhoff—Love Theory of Inhomogeneous Anisotropic Plates

In this paper we study the procedure of reducing the three-dimensional problem of elasticity theory for a thin inhomogeneous anisotropic plate to a two-dimensional problem in the median plane. The plate is in equilibrium under the action of volume and surface forces of general form. À notion of inte...

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Bibliographic Details
Published in:Moscow University mechanics bulletin Vol. 73; no. 3; pp. 60 - 66
Main Authors: Gorbachev, V. I., Kabanova, L. A.
Format: Journal Article
Language:English
Published: Moscow Pleiades Publishing 01-05-2018
Springer Nature B.V
Subjects:
Anisotropic plates
Anisotropy
Classical Mechanics
Deformation
Elasticity
Equilibrium equations
Hypotheses
Mathematical analysis
Physics
Physics and Astronomy
Taylor series
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Summary:In this paper we study the procedure of reducing the three-dimensional problem of elasticity theory for a thin inhomogeneous anisotropic plate to a two-dimensional problem in the median plane. The plate is in equilibrium under the action of volume and surface forces of general form. À notion of internal force factors is introduced. The equations for force factors (the equilibrium equations in the median plane) are obtained from the thickness-averaged three-dimensional equations of elasticity theory. In order to establish the relation between the internal force factors and the characteristics of the deformed middle surface, we use some prior assumptions on the distribution of displacements along the thickness of the plate. To arrange these assumptions in order, the displacements of plate points are expanded into Taylor series in the transverse coordinate with consideration of the physical hypotheses on the deformation of a material fiber being originally perpendicular to the median plane. The well-known Kirchhoff—Love hypothesis is considered in detail. À closed system of equations for the theory of inhomogeneous anisotropic plates is obtained on the basis of the Kirchhoff—Love hypothesis. The boundary conditions are formulated from the Lagrange variational principle.
ISSN:0027-1330
1934-8452
DOI:10.3103/S0027133018020020