One-Dimensional Modelling of Developable Elastic Strips by Geometric Constraints and their Link to Surface Isometry

B. Bauer, Michael Roller, J. Linn, B. Simeon
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引用次数: 1

Abstract

The goal of this paper is to introduce a kinematical reduction for the structural model of Kirchhoff-Love shells with developable base surfaces. The dimensional reduction to a curve and a vector field along it decreases the involved number of degrees of freedom. Local coordinates in form of a relatively parallel frame allow us to simplify the geometric constraints occurring in the model and prevent instabilities caused by points or segments of zero curvature. The core of this work is to prove equivalence of these requirements and the isometry of the transformation. Subsequently, we derive the one-dimensional bending energy functional for rectangular strips. In order to compute the equilibrium state of a static shell, we minimise a penalised version of this functional over the finitely many degrees of freedom stemming from an isogeometric discretisation. Several example strips clamped at both ends illustrate the feasibility of this approach.
可展弹性条的几何约束一维建模及其与曲面等距的联系
本文的目的是为基面可展的基霍夫-洛夫壳结构模型引入一种运动学约简。对曲线和沿着曲线的向量场的降维减少了所涉及的自由度的数量。以相对平行框架形式的局部坐标使我们能够简化模型中出现的几何约束,并防止由零曲率的点或段引起的不稳定。这项工作的核心是证明这些要求的等价性和变换的等距性。随后,我们导出了矩形带材的一维弯曲能泛函。为了计算静态壳的平衡状态,我们最小化了这个函数在有限多个自由度上的惩罚版本,这些自由度源于等高离散化。在两端夹紧的几个例子说明了这种方法的可行性。
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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