Mathematical Description for a Particular Case of Ellipse Focus Quasi-Rotation Around an Elliptical Axis

I. Antonova, E. Solomonova, N. Kadykova
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引用次数: 4

Abstract

In this paper is provided mathematical analysis related to a particular case for a point quasi-rotation around a curve of an elliptical axis. The research complements the previous works in this direction. Has been considered a special case, in which the quasi-rotation correspondence is applied to a point located at the elliptical axis’s focus. This case is special, since the quasi-rotation center search is not invariant and does not lead to determination of four quasi-rotation centers, as in the general case. A constructive approach to the rotation center search shows that any point lying on the elliptical axis can be the quasi-rotation center. This feature leads to the fact that instead of four circles, the quasi-rotation of a point lying in the elliptical axis’s focus leads to the formation of an infinite number of circle families, which together form a channel surface. The resulting surface is a Dupin cyclide, whose throat circle has a zero radius and coincides with the original generating point. While analyzing are considered all cases of the rotation center location. Geometric constructions have been performed based on previously described methods of rotation around flat geometric objects’ curvilinear axes. For the study, the mathematical relationship between the coordinates of the initial set point, the axis curve equation and the motion trajectory equation of this point around the axis curve, described in earlier papers on this topic, is used. In the proposed paper has been provided the derivation of the motion trajectory equation for a point around the elliptic axis’s curve.
椭圆焦点绕椭圆轴准旋转的一种特殊情况的数学描述
本文给出了点绕椭圆轴曲线拟旋转的一种特殊情况的数学分析。本研究是对这一方向上前人工作的补充。考虑了一种特殊情况,其中准旋转对应应用于位于椭圆轴焦点处的点。这种情况是特殊的,因为准旋转中心搜索不是不变的,并且不会像一般情况那样导致确定四个准旋转中心。一种构造性的旋转中心搜索方法表明,位于椭圆轴上的任何点都可以是准旋转中心。这一特征导致了这样一个事实,即不是四个圆,而是位于椭圆轴焦点上的一个点的准旋转导致了无限数量的圆族的形成,这些圆族共同形成了一个通道表面。得到的曲面为杜宾圆环,其喉圆半径为零,与原生成点重合。在分析时考虑了所有情况下的旋转中心位置。几何构造是基于先前描述的围绕平面几何对象的曲线轴旋转的方法进行的。在本研究中,使用了先前关于该主题的论文中描述的初始设定点坐标、轴曲线方程和该点绕轴曲线的运动轨迹方程之间的数学关系。本文给出了点绕椭圆轴曲线运动轨迹方程的推导。
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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