A finite element for nonlinear three-dimensional Kirchhoff rods

IF 4.4 2区 工程技术 Q1 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS
F. Armero
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引用次数: 0

Abstract

This paper presents the formulation of a finite element method for nonlinear Kirchhoff rods (i.e. without transverse shear strain) in the general three-dimensional setting defined by a Cosserat director treatment of the cross sections attached to the rod's axis. The new element is based on a G1 interpolation of the rod's geometry in terms of Hermite shape functions of the rod's axis (including its tangent defining the tangential director), while the transversal directors defining the different bending and torsional responses of the rod consider a Lagrangian interpolation of the section directors. This direct interpolation of the directors, as opposed of underlying rotation vectors, assures the objectivity of the proposed formulation. In fact, the invariance properties of the resulting finite element are analyzed in detail, assuring the correct resolution of the local fundamental equilibrium relations between forces and moments, hence avoiding the so-called “self-straining” associated to separate treatments of the rod's geometry and its kinematics. Several representative numerical simulations are presented illustrating these properties as well as the appropriateness of the proposed formulation for the analysis of thin rods undergoing large finite deformations in the three-dimensional range.

非线性三维基尔霍夫杆有限元
本文介绍了非线性基尔霍夫杆(即无横向剪切应变)的有限元方法,该方法在一般三维环境中由连接杆轴线的横截面的 Cosserat 导向处理定义。新元素基于杆的几何形状的 G1 插值,即杆轴的 Hermite 形状函数(包括定义切向导向的切线),而定义杆的不同弯曲和扭转响应的横向导向则考虑截面导向的拉格朗日插值。相对于基本旋转矢量而言,这种对导程的直接插值确保了所提议公式的客观性。事实上,对由此产生的有限元的不变性进行了详细分析,确保正确解决力和力矩之间的局部基本平衡关系,从而避免了与单独处理杆的几何形状和运动学相关的所谓 "自我约束"。本文介绍了几个具有代表性的数值模拟,说明了这些特性以及所提出的公式对于分析三维范围内发生较大有限变形的细杆的适用性。
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
Computers & Structures
Computers & Structures 工程技术-工程:土木
CiteScore
8.80
自引率
6.40%
发文量
122
审稿时长
33 days
期刊介绍: Computers & Structures publishes advances in the development and use of computational methods for the solution of problems in engineering and the sciences. The range of appropriate contributions is wide, and includes papers on establishing appropriate mathematical models and their numerical solution in all areas of mechanics. The journal also includes articles that present a substantial review of a field in the topics of the journal.
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