𝐻2-Conformal Approximation of Miura Surfaces

IF 1 4区 数学 Q3 MATHEMATICS, APPLIED
F. Marazzato
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引用次数: 0

Abstract

Abstract The Miura ori is a very classical origami pattern used in numerous applications in engineering. A study of the shapes that surfaces using this pattern can assume is still lacking. A constrained nonlinear partial differential equation (PDE) that models the possible shapes that a periodic Miura tessellation can take in the homogenization limit has been established recently and solved only in specific cases. In this paper, the existence and uniqueness of a solution to the unconstrained PDE is proved for general Dirichlet boundary conditions. Then an H 2 H^{2} -conforming discretization is introduced to approximate the solution of the PDE coupled to a Newton method to solve the associated discrete problem. A convergence proof for the method is given as well as a convergence rate. Finally, numerical experiments show the robustness of the method and that nontrivial shapes can be achieved using periodic Miura tessellations.
𝐻Miura曲面的2-保形逼近
摘要Miura ori是一种非常经典的折纸图案,在工程中有许多应用。对使用这种图案的表面可以呈现的形状的研究仍然缺乏。最近建立了一个约束非线性偏微分方程(PDE),该方程对周期性Miura镶嵌在均匀化极限下可能呈现的形状进行建模,并且仅在特定情况下求解。本文证明了一般Dirichlet边界条件下无约束PDE解的存在性和唯一性。然后引入H2 H^{2}-相容离散化来近似PDE的解,并将其耦合到牛顿方法来求解相关的离散问题。给出了该方法的收敛性证明以及收敛速度。最后,数值实验表明了该方法的稳健性,并且使用周期性的Miura镶嵌可以实现非平凡的形状。
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来源期刊
CiteScore
2.40
自引率
7.70%
发文量
54
期刊介绍: The highly selective international mathematical journal Computational Methods in Applied Mathematics (CMAM) considers original mathematical contributions to computational methods and numerical analysis with applications mainly related to PDEs. CMAM seeks to be interdisciplinary while retaining the common thread of numerical analysis, it is intended to be readily readable and meant for a wide circle of researchers in applied mathematics. The journal is published by De Gruyter on behalf of the Institute of Mathematics of the National Academy of Science of Belarus.
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