Nonlinear dynamic behaviors of viscoelastic shallow arches

doi:10.1007/s10483-009-0611-y

Applied Mathematics and Mechanics (English Edition) ›› 2009, Vol. 30 ›› Issue (6): 771-777.doi: https://doi.org/10.1007/s10483-009-0611-y

Nonlinear dynamic behaviors of viscoelastic shallow arches

易壮鹏¹ 王连华² 赵跃宇²

1. School of Civil Engineering and Architecture, Changsha University of Science and Technology,Changsha 410076, P. R. China;
2. College of Civil Engineering, Hunan University, Changsha 410114, P. R. China

收稿日期:2008-08-22 修回日期:2009-02-25 出版日期:2009-06-01 发布日期:2009-06-01

Nonlinear dynamic behaviors of viscoelastic shallow arches

Zhuang-Peng YI¹, Lian-Hua WANG², Yue-Yu ZHAO²

1. School of Civil Engineering and Architecture, Changsha University of Science and Technology,Changsha 410076, P. R. China;
2. College of Civil Engineering, Hunan University, Changsha 410114, P. R. China

Received:2008-08-22 Revised:2009-02-25 Online:2009-06-01 Published:2009-06-01

摘要/Abstract

摘要： The nonlinear dynamic behaviors of nonlinear viscoelastic shallow arches subjected to external excitation are investigated. Based on the d’Alembert principle and the Euler-Bernoulli assumption, the governing equation of a shallow arch is obtained, where the Leaderman constitutive relation is applied. The Galerkin method and numerical integration are used to study the nonlinear dynamic properties of the viscoelastic shallow arches. Moreover, the effects of the rise, the material parameter and excitation on the nonlinear dynamic behaviors of the shallow arch are investigated. The results show that viscoelastic shallow arches may appear to have a chaotic motion for certain conditions.

关键词: viscoelastic shallow arch, Leaderman constitutive relation, Galerkin method, bifurcation, chaos

Abstract: The nonlinear dynamic behaviors of nonlinear viscoelastic shallow arches subjected to external excitation are investigated. Based on the d’Alembert principle and the Euler-Bernoulli assumption, the governing equation of a shallow arch is obtained, where the Leaderman constitutive relation is applied. The Galerkin method and numerical integration are used to study the nonlinear dynamic properties of the viscoelastic shallow arches. Moreover, the effects of the rise, the material parameter and excitation on the nonlinear dynamic behaviors of the shallow arch are investigated. The results show that viscoelastic shallow arches may appear to have a chaotic motion for certain conditions.

Key words: viscoelastic shallow arch, Leaderman constitutive relation, Galerkin method, bifurcation, chaos

中图分类号:

易壮鹏王连华赵跃宇. Nonlinear dynamic behaviors of viscoelastic shallow arches[J]. Applied Mathematics and Mechanics (English Edition), 2009, 30(6): 771-777.

Zhuang-Peng YI;Lian-Hua WANG;Yue-Yu ZHAO. Nonlinear dynamic behaviors of viscoelastic shallow arches[J]. Applied Mathematics and Mechanics (English Edition), 2009, 30(6): 771-777.

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Nonlinear dynamic behaviors of viscoelastic shallow arches

Nonlinear dynamic behaviors of viscoelastic shallow arches

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