球面和双曲二次曲线

Eighteen Essays in Non-Euclidean Geometry Pub Date : 2017-02-22 DOI:10.4171/196-1/15

Ivan Izmestiev

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引用次数: 9

摘要

本文主要以查尔斯和斯托里的著作为基础，对非欧几里得二次曲线的度量性质进行了综述。球锥是球与二次锥的交点;类似地，双曲二次曲线是Beltrami-Cayley-Klein圆盘与仿射二次曲线的交点。非欧几里得二次曲线与欧几里得二次曲线具有相似的度规性质，而且由于这里的极性比欧几里得平面更有效。

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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Spherical and hyperbolic conics

This is a survey of metric properties of non-Euclidean conics, mainly based on works of Chasles and Story. A spherical conic is the intersection of the sphere with a quadratic cone; similarly, a hyperbolic conic is the intersection of the Beltrami-Cayley-Klein disk with an affine conic. Non-Euclidean conics have metric properties similar to those of Euclidean conics, and even more due to the polarity that works here better than in the Euclidean plane.

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Eighteen Essays in Non-Euclidean Geometry

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