Lobachevskii Journal of Mathematics

, Volume 39, Issue 3, pp 448–457 | Cite as

Geometrically Nonlinear Problem of Longitudinal and Transverse Bending of a Sandwich Plate with Transversally Soft Core

Article
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Abstract

The stress-strain state of sandwich plates with a transversally soft core is determined in one-dimensional geometrically nonlinear formulation. It is supposed that the edges of carrier layers in the right end section are rigidly clamped and the core is not adhesively bound with the support element. The edges of carrier layers in the left end section are assumed to be hinged on diaphragms that are absolutely rigid in the transverse direction, glued to the end section of the core. A load is applied to the median surface of the first carrier layer from the left end section. On the basis of the generalized Lagrange principle, the general statement is formulated as an operator equation in the Sobolev space. The operator is shown to be pseudo-monotonic and coercive. This makes it possible to prove a theorem that there exists a solution. A two-layer iterative method is proposed for solving the problem. The convergence of the method is examined using the additional properties of the operator (i.e., quasi-potentiality and bounded Lipschitz continuity). The iteration parameter variation limits ensuring the method convergence are found. A software package has been developed to conduct numerical experiments for the problem of longitudinal–transverse bending of a sandwich plate. Tabulation is performed with respect to both longitudinal and transverse loads. The results indicate that in terms of weight sophistication and for the given form of loading, the sandwich plate of an asymmetric structure with unequal thicknesses of carrier layers is the most rational and equally stressed plate.

Keywords

Sandwich plate transversely soft core generalized statement solvability theorem iterative method convergence theorem numerical experiment 
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Copyright information

© Pleiades Publishing, Ltd. 2018

Authors and Affiliations

  • I. B. Badriev
    • 1
  • M. V. Makarov
    • 1
    • 2
  • V. N. Paimushin
    • 1
    • 2
  1. 1.Kazan (Volga Region) Federal UniversityKazanRussia
  2. 2.A. N. Tupolev Kazan National Technical Research UniversityKazanRussia

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