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Dynamic equations of motion for inextensible beams and plates

Publication ,  Journal Article
Deliyianni, M; McHugh, K; Webster, JT; Dowell, E
Published in: Archive of Applied Mechanics
June 1, 2022

The large deflections of cantilevered beams and rectangular plates are modeled and discussed. Traditional nonlinear elastic models (e.g., von Karman’s) employ elastic restoring forces based on the effect of stretching on bending, and these are less applicable to cantilevers. Recent experimental work indicates that elastic cantilevers are subject to nonlinear inertial and stiffness effects. We review a recently established (quasilinear and nonlocal) cantilevered beam model, and consider some extensions to two spatial dimensions, namely inextensible plates. Our principal configuration is that of a thin, isotropic, homogeneous rectangular plate, clamped on the one edge and free on the remaining three. We proceed through the geometric and elastic modeling to obtain equations of motion via Hamilton’s principle for the appropriately specified energies. We then enforce effective inextensibility constraints through Lagrange multipliers. Multiple plate analogs of the established 1D model are obtained, based on assumptions. In total, we present three distinct nonlinear partial differential equation models and, additionally, describe a class of “higher-order” models. Each model has particular advantages and drawbacks for both mathematical and engineering analyses. We conclude with a discussion of the various models, as well as some analytical problems.

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Published In

Archive of Applied Mechanics

DOI

EISSN

1432-0681

ISSN

0939-1533

Publication Date

June 1, 2022

Volume

92

Issue

6

Start / End Page

1929 / 1952

Related Subject Headings

  • Mechanical Engineering & Transports
  • 4901 Applied mathematics
  • 4017 Mechanical engineering
  • 0915 Interdisciplinary Engineering
  • 0913 Mechanical Engineering
  • 0102 Applied Mathematics
 

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Deliyianni, M., McHugh, K., Webster, J. T., & Dowell, E. (2022). Dynamic equations of motion for inextensible beams and plates. Archive of Applied Mechanics, 92(6), 1929–1952. https://doi.org/10.1007/s00419-022-02157-7
Deliyianni, M., K. McHugh, J. T. Webster, and E. Dowell. “Dynamic equations of motion for inextensible beams and plates.” Archive of Applied Mechanics 92, no. 6 (June 1, 2022): 1929–52. https://doi.org/10.1007/s00419-022-02157-7.
Deliyianni M, McHugh K, Webster JT, Dowell E. Dynamic equations of motion for inextensible beams and plates. Archive of Applied Mechanics. 2022 Jun 1;92(6):1929–52.
Deliyianni, M., et al. “Dynamic equations of motion for inextensible beams and plates.” Archive of Applied Mechanics, vol. 92, no. 6, June 2022, pp. 1929–52. Scopus, doi:10.1007/s00419-022-02157-7.
Deliyianni M, McHugh K, Webster JT, Dowell E. Dynamic equations of motion for inextensible beams and plates. Archive of Applied Mechanics. 2022 Jun 1;92(6):1929–1952.
Journal cover image

Published In

Archive of Applied Mechanics

DOI

EISSN

1432-0681

ISSN

0939-1533

Publication Date

June 1, 2022

Volume

92

Issue

6

Start / End Page

1929 / 1952

Related Subject Headings

  • Mechanical Engineering & Transports
  • 4901 Applied mathematics
  • 4017 Mechanical engineering
  • 0915 Interdisciplinary Engineering
  • 0913 Mechanical Engineering
  • 0102 Applied Mathematics