Integration of Three-Dimensional Reflections from Curved Mirrors Using Computer Algebra Tools

Geometry & Graphics Pub Date : 2024-03-12 DOI:10.12737/2308-4898-2024-11-4-15-31

O. Suncov, L. Zhikharev, A. Efremov

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Abstract

This article is a continuation of the study of the process of reflection of various objects from curved mirrors. So, earlier in the works [18; 20], a geometric method of constructing the results of reflections was described, which was implemented mathematically in the article [38] using the principles of analytical geometry [6; 11–14; 30]. The obtained analytical equations of the reflection results were visualized in the Wolfram Mathematica [24] program with the ability to dynamically change the parameters of the mirror and the reflected object. However, in the listed works, only cases of reflection on the plane were considered. In this study, attention is paid to a more complex case — reflection in three-dimensional space. The article considered the reflection of a point from surfaces of the second order: a cylinder, a cone, a single-cavity and double-cavity hyperboloids, a sphere, elliptical and hyperbolic paraboloids, and from a torus — a surface of the fourth order. As before, the reflection result obtained in each of the cases is accompanied by a program code for Wolfram Mathematica, which allows the reader to independently simulate the reflection process with different initial parameters. In addition, the relationships between the results obtained were analyzed — both the relationships between the results of various three-dimensional reflections, and the relationship of the results of three-dimensional reflections with the results of similar plane reflections. In particular, on the basis of this, a hypothesis was formulated about the relationship between the curvature of the Gaussian mirror and the dimension of the object obtained as a result of reflection. Based on the results of the work, conclusions were drawn and prospects for further research were outlined. One of them is to obtain an analytical mechanism for describing complex geometric surfaces using a set of simpler objects. This feature will increase the efficiency of specialists when working with reflections from complex surfaces in areas such as aircraft construction (for creating aerodynamic surfaces and air ducts), medicine [40], shipbuilding [7; 31; 42], etc.

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利用计算机代数工具对曲面镜的三维反射进行整合

本文是对各种物体从曲面镜面反射过程研究的延续。因此，早先的作品[18; 20]描述了构建反射结果的几何方法，文章[38]利用解析几何原理[6; 11-14; 30]对该方法进行了数学实现。得到的反射结果分析方程在 Wolfram Mathematica [24] 程序中可视化，并能动态改变镜子和反射物体的参数。然而，在上述著作中，只考虑了平面反射的情况。本研究关注的是更为复杂的情况--三维空间中的反射。文章考虑了点从二阶表面的反射：圆柱体、圆锥体、单腔和双腔双曲面、球体、椭圆和双曲抛物面，以及从环面--四阶表面的反射。与以往一样，在每种情况下获得的反射结果都附有 Wolfram Mathematica 的程序代码，读者可以使用不同的初始参数独立模拟反射过程。此外，还分析了所得结果之间的关系--既包括各种三维反射结果之间的关系，也包括三维反射结果与类似平面反射结果之间的关系。特别是，在此基础上，对高斯镜的曲率与反射结果所得到的物体尺寸之间的关系提出了假设。在研究成果的基础上，得出了结论并概述了进一步研究的前景。其中之一是获得一种分析机制，利用一组较简单的对象来描述复杂的几何表面。在飞机制造（用于创建空气动力表面和空气管道）、医学 [40]、造船 [7; 31; 42] 等领域，这一功能将提高专家处理复杂表面反射的效率。

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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Geometry & Graphics

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