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An elastic plate bending equation of second-order accuracy. / Tovstik, Petr; Tovstik, Tatiana Petrovna.

в: Acta Mechanica, Том 228, № 10, 01.10.2017, стр. 3403-3419.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Tovstik, P & Tovstik, TP 2017, 'An elastic plate bending equation of second-order accuracy', Acta Mechanica, Том. 228, № 10, стр. 3403-3419. https://doi.org/10.1007/s00707-017-1880-x

APA

Vancouver

Author

Tovstik, Petr ; Tovstik, Tatiana Petrovna. / An elastic plate bending equation of second-order accuracy. в: Acta Mechanica. 2017 ; Том 228, № 10. стр. 3403-3419.

BibTeX

@article{9e0099ca814b4eb5ace5f58f55d91764,
title = "An elastic plate bending equation of second-order accuracy",
abstract = "A study is carried out of a thin plate of constant thickness made of linearly elastic material which is transversally isotropic and heterogeneous in the thickness direction. Asymptotic expansions in powers of the relative plate thickness are constructed, and the bending equation of second-order accuracy (the SA model) is delivered. The results of the SA model are compared with the Kirchhoff–Love classical model and with the Timoshenko–Reissner (TR) model, as well as with the exact solution. To this end, some problems for a functionally gradient plate bending, and for a multi-layer plate bending and free vibration are solved and analysed. The range of plate heterogeneity, for which the error of the approximate models is small, is established. The TR model and the SA model are proved to yields results close to each other and the exact results for a very broad range of heterogeneity. That is why the generalized TR model for one-layered homogeneous transversely isotropic plate is proposed. Parameters of this model are chosen so that the results are close to the exact results and the results by the SA model. For the Navier boundary conditions, the analytical solution of 3D problems for a rectangular heterogeneous plate is constructed.",
author = "Petr Tovstik and Tovstik, {Tatiana Petrovna}",
year = "2017",
month = oct,
day = "1",
doi = "10.1007/s00707-017-1880-x",
language = "English",
volume = "228",
pages = "3403--3419",
journal = "Acta Mechanica",
issn = "0001-5970",
publisher = "Springer Nature",
number = "10",

}

RIS

TY - JOUR

T1 - An elastic plate bending equation of second-order accuracy

AU - Tovstik, Petr

AU - Tovstik, Tatiana Petrovna

PY - 2017/10/1

Y1 - 2017/10/1

N2 - A study is carried out of a thin plate of constant thickness made of linearly elastic material which is transversally isotropic and heterogeneous in the thickness direction. Asymptotic expansions in powers of the relative plate thickness are constructed, and the bending equation of second-order accuracy (the SA model) is delivered. The results of the SA model are compared with the Kirchhoff–Love classical model and with the Timoshenko–Reissner (TR) model, as well as with the exact solution. To this end, some problems for a functionally gradient plate bending, and for a multi-layer plate bending and free vibration are solved and analysed. The range of plate heterogeneity, for which the error of the approximate models is small, is established. The TR model and the SA model are proved to yields results close to each other and the exact results for a very broad range of heterogeneity. That is why the generalized TR model for one-layered homogeneous transversely isotropic plate is proposed. Parameters of this model are chosen so that the results are close to the exact results and the results by the SA model. For the Navier boundary conditions, the analytical solution of 3D problems for a rectangular heterogeneous plate is constructed.

AB - A study is carried out of a thin plate of constant thickness made of linearly elastic material which is transversally isotropic and heterogeneous in the thickness direction. Asymptotic expansions in powers of the relative plate thickness are constructed, and the bending equation of second-order accuracy (the SA model) is delivered. The results of the SA model are compared with the Kirchhoff–Love classical model and with the Timoshenko–Reissner (TR) model, as well as with the exact solution. To this end, some problems for a functionally gradient plate bending, and for a multi-layer plate bending and free vibration are solved and analysed. The range of plate heterogeneity, for which the error of the approximate models is small, is established. The TR model and the SA model are proved to yields results close to each other and the exact results for a very broad range of heterogeneity. That is why the generalized TR model for one-layered homogeneous transversely isotropic plate is proposed. Parameters of this model are chosen so that the results are close to the exact results and the results by the SA model. For the Navier boundary conditions, the analytical solution of 3D problems for a rectangular heterogeneous plate is constructed.

UR - http://www.scopus.com/inward/record.url?scp=85020541822&partnerID=8YFLogxK

U2 - 10.1007/s00707-017-1880-x

DO - 10.1007/s00707-017-1880-x

M3 - Article

AN - SCOPUS:85020541822

VL - 228

SP - 3403

EP - 3419

JO - Acta Mechanica

JF - Acta Mechanica

SN - 0001-5970

IS - 10

ER -

ID: 9281917