Isometric deformations of surfaces of translation

IF 1 Q4 MECHANICS

Mathematics and Mechanics of Complex Systems Pub Date : 2023-10-12 DOI:10.2140/memocs.2024.12.1

Hussein Nassar

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引用次数: 0

Abstract

A \emph{surface of translation} is a sum $(u,v)\mapsto\gt\alpha(u)+\gt\beta(v)$ of two space curves: a \emph{path} $\gt\alpha$ and a \emph{profile} $\gt\beta$. A fundamental problem of differential geometry and shell theory is to determine the ways in which surfaces deform isometrically, i.e., by bending without stretching. Here, we explore how surfaces of translation bend. Existence conditions and closed-form expressions for special bendings of the infinitesimal and finite kinds are provided. In particular, all surfaces of translation admit a purely torsional infinitesimal bending. Surfaces of translation whose path and profile belong to an elliptic cone or to two planes but never to their intersection further admit a torsion-free infinitesimal bending. Should the planes be orthogonal, the infinitesimal bending can be integrated into a torsion-free (finite) bending. Surfaces of translation also admit a torsion-free bending if the path or profile has exactly two tangency directions. Throughout, smooth and piecewise smooth surfaces, i.e., surfaces with straight or curved creases, are invariably dealt with and some extra care is given to situations where the bendings cause new creases to emerge.

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平移表面的等距变形

一个平移面是两个空间曲线的和 $(u,v)/mapsto\gt\alpha(u)+\gt\beta(v)$: 一个是路径 $\gt\alpha$ ，一个是轮廓 $\gt\beta$ 。$gt\beta$.微分几何和壳理论的一个基本问题是确定表面等距变形的方式，即通过弯曲而不拉伸。在此，我们探讨平移表面如何弯曲。我们提供了无穷小和有限类特殊弯曲的存在条件和闭式表达式。特别是，所有平移表面都允许纯粹的扭转无穷小弯曲。其路径和轮廓属于一个椭圆锥或两个平面但绝不属于它们的交点的平移表面进一步允许无扭无穷小弯曲。如果这两个平面是正交的，则无穷小弯曲可以整合为无扭（有限）弯曲。如果平移表面的路径或轮廓恰好有两个切线方向，则也会产生无扭弯曲。在整个计算过程中，光滑表面和片状光滑表面，即带有直线或曲线折痕的表面，始终都会得到处理，对于弯曲导致出现新折痕的情况，也会给予额外的关注。

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

Mathematics and Mechanics of Complex Systems MECHANICS-

CiteScore

3.00

自引率

5.30%

发文量

期刊介绍： MEMOCS is a publication of the International Research Center for the Mathematics and Mechanics of Complex Systems. It publishes articles from diverse scientific fields with a specific emphasis on mechanics. Articles must rely on the application or development of rigorous mathematical methods. The journal intends to foster a multidisciplinary approach to knowledge firmly based on mathematical foundations. It will serve as a forum where scientists from different disciplines meet to share a common, rational vision of science and technology. It intends to support and divulge research whose primary goal is to develop mathematical methods and tools for the study of complexity. The journal will also foster and publish original research in related areas of mathematics of proven applicability, such as variational methods, numerical methods, and optimization techniques. Besides their intrinsic interest, such treatments can become heuristic and epistemological tools for further investigations, and provide methods for deriving predictions from postulated theories. Papers focusing on and clarifying aspects of the history of mathematics and science are also welcome. All methodologies and points of view, if rigorously applied, will be considered.