ON THE USE OF EXTENDED PLATE THEORIES OF VEKUA – AMOSOV TYPE FOR WAVE DISPERSION PROBLEMS

Sergey I. Zhavoronok

doi:10.22337/2587-9618-2018-14-1-36-48

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Published: Mar 30, 2018

DOI: https://doi.org/10.22337/2587-9618-2018-14-1-36-48

Keywords:

hierarchical modeling of plates, dimensional reduction, analytical continuum dynamics, constrained Lagrangian systems, elastic layer, wave dispersion

Sergey I. Zhavoronok

Institute of Applied Mechanics of Russian Academy of Sciences (IAM RAS); Associate Professor of the Department of Strength of Materials, Machine Dynamics and Strength, Moscow Aviation Institute (National Research University)

Abstract

The extended plate theory of I.N. Vekua – A.A. Amosov type is constructed on the background of the dimensional reduction approach and the Lagrangian variational formalism of analytical dynamics. The proposed theory allows one to obtain the hierarchy of refined plate models of different orders and to satisfy the boundary conditions on plates’ faces exactly by introducing the corresponding constraint equations into the Lagrangian model of two-dimensional continuum. The normal wave dispersion in an elastic layer is considered, the convergence of the two-dimensional solutions to the exact one is studied for the locking phase frequencies, the dimensionless stress distributions across the thickness of a layer are shown.

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How to Cite

Zhavoronok, S. I. (2018). ON THE USE OF EXTENDED PLATE THEORIES OF VEKUA – AMOSOV TYPE FOR WAVE DISPERSION PROBLEMS. International Journal for Computational Civil and Structural Engineering, 14(1), 36–48. https://doi.org/10.22337/2587-9618-2018-14-1-36-48