Revisiting the nonlinear elastic problem of internally constrained beams in a perturbation perspective

IF 4.4 2区 工程技术 Q1 MECHANICS
A. Luongo , D. Zulli , F. D’Annibale , A. Casalotti
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引用次数: 0

Abstract

Unshearable and inextensible planar beams, in a static regime of finite displacements, are studied in this paper. A nonlinear mixed model is derived via a direct approach, in which displacements and reactive internal forces are taken as unknowns. The elasto-static problem is then addressed, and the role of the boundary conditions is systematically discussed. The relevant solutions for selected classes of problems are pursued via a perturbation method. It is shown that each considered class calls for a specific algorithm, accounting for a proper scaling and expansion of the variables. Finally, the asymptotic solutions are compared with benchmark numerical computations, grounded on finite-element analyses. The paper is focused on the case of longitudinal force significantly smaller than the buckling load, leaving the case of large force to future developments, where a different perturbation scheme is required.

从扰动角度重新审视内约束梁的非线性弹性问题
本文研究了在有限位移静态条件下的不可剪切和不可拉伸平面梁。通过直接方法推导出一个非线性混合模型,其中位移和反应内力均为未知数。然后讨论了弹性静态问题,并系统地讨论了边界条件的作用。通过扰动法研究了选定问题类别的相关解决方案。结果表明,考虑到变量的适当缩放和扩展,每一类问题都需要一种特定的算法。最后,将渐近解与基于有限元分析的基准数值计算进行了比较。本文重点讨论了纵向力明显小于屈曲载荷的情况,而对于需要采用不同扰动方案的大力情况,则留待未来发展。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
7.00
自引率
7.30%
发文量
275
审稿时长
48 days
期刊介绍: The European Journal of Mechanics endash; A/Solids continues to publish articles in English in all areas of Solid Mechanics from the physical and mathematical basis to materials engineering, technological applications and methods of modern computational mechanics, both pure and applied research.
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