Equidistants for families of surfaces

IF 0.4 Q4 MATHEMATICS

Journal of Singularities Pub Date : 2020-01-21 DOI:10.5427/jsing.2020.21f

P. Giblin, Graham M. Reeve

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引用次数: 2

Abstract

For a smooth surface in $\mathbb{R}^3$ this article contains local study of certain affine equidistants, that is loci of points at a fixed ratio between points of contact of parallel tangent planes (but excluding ratios 0 and 1 where the equidistant contains one or other point of contact). The situation studied occurs generically in a 1-parameter family, where two parabolic points of the surface have parallel tangent planes at which the unique asymptotic directions are also parallel. The singularities are classified by regarding the equidistants as critical values of a 2-parameter unfolding of maps from $\mathbb{R}^4$ to $\mathbb{R}^3$. In particular, the singularities that occur near the so-called `supercaustic chord', joining the two special parabolic points, are classified. For a given ratio along this chord either one or three special points are identified at which singularities of the equidistant become more special. Many of the resulting singularities have occurred before in the literature in abstract classifications, so the article also provides a natural geometric setting for these singularities, relating back to the geometry of the surfaces from which they are derived.

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曲面族的等距

对于$\mathbb{R}^3$中的光滑曲面，本文包含某些仿射等距的局部研究，即平行切平面的接触点之间的固定比例的点轨迹(但不包括比率0和1，其中等距包含一个或另一个接触点)。所研究的情况一般发生在1参数族中，其中曲面的两个抛物线点具有平行的切平面，且唯一渐近方向也是平行的。奇点是通过将等距视为从$\mathbb{R}^4$到$\mathbb{R}^3$映射的2参数展开的临界值来分类的。特别是，在所谓的“超焦散弦”附近出现的奇点，连接两个特殊的抛物线点，被分类。对于这条弦上的一个给定比例，可以确定一个或三个特殊点，在这些点上，等距的奇点变得更加特殊。许多由此产生的奇点在以前的抽象分类文献中已经出现过，因此本文也为这些奇点提供了一个自然的几何设置，与它们派生的表面的几何形状有关。

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

Journal of Singularities MATHEMATICS-

CiteScore

0.90

自引率

0.00%

发文量