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Type: Article
Shadows of a closed curve
Abstract:
A shadow of a geometric object A in a given direction v is the orthogonal projection of A on the hyperplane orthogonal to v. We show that any topological embedding of a circle into Euclidean d-space can have at most two shadows that are simple paths in linearly independent directions. The proof is topological and uses an analog of basic properties of degree of maps on a circle to relations on a circle. This extends a previous result that dealt with the case d = 3. © 2018 The Author(s) 2019.
A shadow of a geometric object A in a given direction v is the orthogonal projection of A on the hyperplane orthogonal to v. We show that any topological embedding of a circle into Euclidean d-space can have at most two shadows that are simple paths in linearly independent directions. The proof is topological and uses an analog of basic properties of degree of maps on a circle to relations on a circle. This extends a previous result that dealt with the case d = 3. © 2018 The Author(s) 2019.
Journal: International Mathematics Research Notices. IMRN
ISSN: 1687-0247
Year: 2020
Number: 7
Pages: 1992-2006
MR Number: 4089442
Revision: 1
Created: 2020-06-30 14:08:30
Modified: 2020-06-30 15:52:58
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