Geometric mechanics of kiri-origami-based bifurcated mechanical metamaterials.

IF 4.3 3区 综合性期刊 Q1 MULTIDISCIPLINARY SCIENCES Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences Pub Date : 2024-10-07 DOI:10.1098/rsta.2024.0010
Yanbin Li, Caizhi Zhou, Jie Yin
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Abstract

We explore a new design strategy of leveraging kinematic bifurcation in creating origami/kirigami-based three-dimensional (3D) hierarchical, reconfigurable, mechanical metamaterials with tunable mechanical responses. We start from constructing three basic, thick, panel-based structural units composed of 4, 6 and 8 rigidly rotatable cubes in close-looped connections. They are modelled, respectively, as 4R, 6R and 8R (R stands for revolute joint) spatial looped kinematic mechanisms, and are used to create a library of reconfigurable hierarchical building blocks that exhibit kinematic bifurcations. We analytically investigate their reconfiguration kinematics and predict the occurrence and locations of kinematic bifurcations through a trial-correction modelling method. These building blocks are tessellated in 3D to create various 3D bifurcated hierarchical mechanical metamaterials that preserve the kinematic bifurcations in their building blocks to reconfigure into different 3D architectures. By combining the kinematics and considering the elastic torsional energy stored in the folds, we develop the geometric mechanics to predict their tunable anisotropic Poisson's ratios and stiffnesses. We find that kinematic bifurcation can significantly effect mechanical responses, including changing the sign of Poisson's ratios from negative to positive beyond bifurcation, tuning the anisotropy, and overcoming the polarity of structural stiffness and enhancing the number of deformation paths with more reconfigured shapes.This article is part of the theme issue 'Origami/Kirigami-inspired structures: from fundamentals to applications'.

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基于基里原纸的分叉机械超材料的几何力学。
我们探索了一种新的设计策略,即利用运动学分叉来创建基于折纸/千纸鹤的三维(3D)分层、可重构、具有可调机械响应的机械超材料。我们首先构建了三个基本的、基于厚面板的结构单元,分别由 4、6 和 8 个刚性可旋转立方体紧密环形连接而成。它们分别被模拟为 4R、6R 和 8R(R 代表旋转接头)空间环形运动机构,并被用于创建一个可重新配置的分层积木库,这些积木会表现出运动分叉。我们对它们的重新配置运动学进行了分析研究,并通过试验校正建模方法预测了运动学分岔的发生和位置。我们将这些构件进行三维拼接,创造出各种三维分叉分层机械超材料,这些超材料保留了构件中的运动学分叉,可重新配置成不同的三维结构。通过结合运动学并考虑褶皱中存储的弹性扭转能量,我们开发了几何力学,以预测其可调各向异性泊松比和刚度。我们发现,运动学分叉可以显著影响机械响应,包括将泊松比的符号从分叉后的负数变为正数、调整各向异性、克服结构刚度的极性以及增加变形路径的数量,从而实现更多的形状重构。
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来源期刊
CiteScore
9.30
自引率
2.00%
发文量
367
审稿时长
3 months
期刊介绍: Continuing its long history of influential scientific publishing, Philosophical Transactions A publishes high-quality theme issues on topics of current importance and general interest within the physical, mathematical and engineering sciences, guest-edited by leading authorities and comprising new research, reviews and opinions from prominent researchers.
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