Modified equations of finite-size layered plates made of orthotropic material. Comparison of the results of numerical calculations with analytical solutions. / Volchkov, Yu M.
In: Journal of Applied Mechanics and Technical Physics, Vol. 58, No. 5, 01.09.2017, p. 904-913.Research output: Contribution to journal › Article › peer-review
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TY - JOUR
T1 - Modified equations of finite-size layered plates made of orthotropic material. Comparison of the results of numerical calculations with analytical solutions
AU - Volchkov, Yu M.
PY - 2017/9/1
Y1 - 2017/9/1
N2 - This paper describes the modified bending equations of layered orthotropic plates in the first approximation. The approximation of the solution of the equation of the three-dimensional theory of elasticity by the Legendre polynomial segments is used to obtain differential equations of the elastic layer. For the approximation of equilibrium equations and boundary conditions of three-dimensional theory of elasticity, several approximations of each desired function (stresses and displacements) are used. The stresses at the internal points of the plate are determined from the defining equations for the orthotropic material, averaged with respect to the plate thickness. The construction of the bending equations of layered plates for each layer is carried out with the help of the elastic layer equations and the conjugation conditions on the boundaries between layers, which are conditions for the continuity of normal stresses and displacements. The numerical solution of the problem of bending of the rectangular layered plate obtained with the help of modified equations is compared with an analytical solution. It is determined that the maximum error in determining the stresses does not exceed 3 %.
AB - This paper describes the modified bending equations of layered orthotropic plates in the first approximation. The approximation of the solution of the equation of the three-dimensional theory of elasticity by the Legendre polynomial segments is used to obtain differential equations of the elastic layer. For the approximation of equilibrium equations and boundary conditions of three-dimensional theory of elasticity, several approximations of each desired function (stresses and displacements) are used. The stresses at the internal points of the plate are determined from the defining equations for the orthotropic material, averaged with respect to the plate thickness. The construction of the bending equations of layered plates for each layer is carried out with the help of the elastic layer equations and the conjugation conditions on the boundaries between layers, which are conditions for the continuity of normal stresses and displacements. The numerical solution of the problem of bending of the rectangular layered plate obtained with the help of modified equations is compared with an analytical solution. It is determined that the maximum error in determining the stresses does not exceed 3 %.
KW - bending equations for layered plates
KW - Legendre polynomials
KW - orthotropic material
UR - http://www.scopus.com/inward/record.url?scp=85037539923&partnerID=8YFLogxK
U2 - 10.1134/S0021894417050170
DO - 10.1134/S0021894417050170
M3 - Article
AN - SCOPUS:85037539923
VL - 58
SP - 904
EP - 913
JO - Journal of Applied Mechanics and Technical Physics
JF - Journal of Applied Mechanics and Technical Physics
SN - 0021-8944
IS - 5
ER -
ID: 9647117