General Analysis of the Shape of Two Similar Second-Order Surfaces’ Intersection Line

Geometry & Graphics Pub Date : 2021-03-04 DOI:10.12737/2308-4898-2021-8-4-24-34

A. Ivaschenko, D. Vavanov

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引用次数: 3

Abstract

The presented paper is devoted to classification questions of fourth-order spatial curves, obtained as a result of intersection of non-degenerate second-order surfaces (quadrics) from the point of view of the forms of the original quadrics generating this curve. At the beginning of the paper is performed a brief historical overview of appearance of well-known and widely used curves ranging from ancient times and ending with the current state in the theory of curves and surfaces. Then a general analysis of the influence of the shape parameters and the relative position of original surfaces on the shape of the resulting curve and some of its parameters (number of components, presence of singular points, curve components flatness or spatiality) is carried out. Curves obtained as a result of intersection of equitype surfaces are described in more detail. The concept of interacting surfaces is introduced, various possible cases of the forms of the quadrics generating the curve are analyzed. A classification of fourth-order curves based on the shape parameters and relative position of second-order surfaces is proposed as an option. Illustrations of the resulting curve shapes with different shape parameters and location of generating quadrics are given. All surfaces and curves are considered in real affine space, taking into account the possibility of constructing them using descriptive geometry methods. Possible further research directions related to the analysis of the curves under discussion are briefly considered. In addition, are expressed hypotheses related to these curves use in the process of studying by students of technical universities the courses in analytical geometry, descriptive geometry, differential geometry and computer graphics. The main attention is paid to forms, therefore a wide variability of the surface shape in the framework of its described equation has been shown, provided by various values of numerical parameters.

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两个相似二阶曲面相交线形状的一般分析

本文从产生四阶空间曲线的原始二次曲面的形式出发，研究了由非退化二阶曲面(二次曲面)相交而得到的四阶空间曲线的分类问题。本文首先对曲线与曲面理论中从古代到现在的著名曲线和广泛应用的曲线的出现进行了简要的历史概述。然后，对形状参数和原始曲面的相对位置对生成曲线形状及其一些参数(成分数、是否存在奇异点、曲线成分的平整度或空间性)的影响进行了一般分析。更详细地描述了由等型曲面相交得到的曲线。引入了相互作用曲面的概念，分析了生成曲线的二次曲面形式的各种可能情况。提出了一种基于二阶曲面的形状参数和相对位置对四阶曲线进行分类的方法。给出了不同形状参数下得到的曲线形状和生成二次曲线的位置。所有的曲面和曲线都是在真实的仿射空间中考虑的，考虑到使用描述几何方法构造它们的可能性。简要地考虑了与所讨论的曲线分析有关的可能的进一步研究方向。此外，还提出了与这些曲线相关的假设，并应用于工科学生在解析几何、描述几何、微分几何和计算机图形学等课程的学习过程中。主要关注的是形式，因此，在其描述的方程框架内，表面形状的广泛可变性已被显示，由数值参数的不同值提供。

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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