Dynamic Nonlinear Buckling of Viscoelastic Plate Allowing for Higher Order Modes

Yuanxiang Sun*

*Corresponding author for this work

Research output: Chapter in Book/Report/Conference proceedingConference contributionpeer-review

Abstract

The chaotic theory is employed to investigate the dynamic stability of viscoelastic plate with geometry nonlinearity. The influence of high order modes on buckling of viscoelastic plate is considered. The dynamic buckling of viscoelastic plates subject to in-plane periodic load is studied. The von-Karman nonlinear geometry equations are introduced and the linear viscoelastic model is employed. For the sake of obtaining more accurate result, the deflection is described as a trigonometric series with 4 terms instead of single term. The sign of the biggest Lyapunov exponent of the motion is employed to determine the stability of viscoelastic plate. Comparison is made between the 4 items results and 1 term results.

Original languageEnglish
Title of host publicationProceedings of 2022 19th International Bhurban Conference on Applied Sciences and Technology, IBCAST 2022
PublisherInstitute of Electrical and Electronics Engineers Inc.
Pages170-174
Number of pages5
ISBN (Electronic)9781665460514
DOIs
Publication statusPublished - 2022
Event19th International Bhurban Conference on Applied Sciences and Technology, IBCAST 2022 - Islamabad, Pakistan
Duration: 16 Aug 202220 Aug 2022

Publication series

NameProceedings of 2022 19th International Bhurban Conference on Applied Sciences and Technology, IBCAST 2022

Conference

Conference19th International Bhurban Conference on Applied Sciences and Technology, IBCAST 2022
Country/TerritoryPakistan
CityIslamabad
Period16/08/2220/08/22

Keywords

  • dynamic buckling
  • high order modes
  • viscoelastic plate

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