Existence of Two View Chiral Reconstructions

IF 1.6 2区 数学 Q2 MATHEMATICS, APPLIED SIAM Journal on Applied Algebra and Geometry Pub Date : 2020-11-14 DOI:10.1137/20m1381848
Andrew Pryhuber, Rainer Sinn, Rekha R. Thomas
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引用次数: 4

Abstract

A fundamental question in computer vision is whether a set of point pairs is the image of a scene that lies in front of two cameras. Such a scene and the cameras together are known as a chiral reconstruction of the point pairs. In this paper we provide a complete classification of k point pairs for which a chiral reconstruction exists. The existence of chiral reconstructions is equivalent to the non-emptiness of certain semialgebraic sets. For up to three point pairs, we prove that a chiral reconstruction always exists while the set of five or more point pairs that do not have a chiral reconstruction is Zariski-dense. We show that for five generic point pairs, the chiral region is bounded by line segments in a Schlafli double six on a cubic surface with 27 real lines. Four point pairs have a chiral reconstruction unless they belong to two non-generic combinatorial types, in which case they may or may not.
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两视图手性重构的存在性
计算机视觉中的一个基本问题是,一组点对是否就是两个摄像头前的场景图像。这样的场景和摄像机一起被称为点对的手性重建。本文给出了存在手性重构的k个点对的完全分类。手性重构的存在性等价于某些半代数集的非空性。对于最多3个点对,我们证明了一个手性重构总是存在的,而5个或5个以上没有手性重构的点对的集合是zariski密集的。我们证明了在27条实线的三次曲面上,对于5个一般点对,手性区域以Schlafli双六线段为界。四个点对具有手性重构,除非它们属于两个非泛型组合类型,在这种情况下,它们可能是也可能不是。
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
CiteScore
2.20
自引率
0.00%
发文量
19
期刊最新文献
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