Detecting and decomposing self-overlapping curves

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Detecting and decomposing self-overlapping curves

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Annual Symposium on Computational Geometry archive
Proceedings of the fifth annual symposium on Computational geometry table of contents

Saarbruchen, West Germany

Pages: 44 - 50

Year of Publication: 1989

ISBN:0-89791-318-3

Authors

P. W. Shor	AT&T Bell Laboratories Murray Hill, New Jersey
C. J. van Wyk	AT&T Bell Laboratories Murray Hill, New Jersey

Sponsors

SIGACT: ACM Special Interest Group on Algorithms and Computation Theory
SIGGRAPH: ACM Special Interest Group on Computer Graphics and Interactive Techniques

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 2, Downloads (12 Months): 16, Citation Count: 0

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ABSTRACT

Paint one side of a rubber disk black and the other side white; stretch the disk any way you wish in three-dimensional space, subject to the condition that from any point in space, if you look down you see either the white side of the disk or nothing at all. Now make the stretched disk transparent but color its boundary black; project its boundary into a plane that lies below the disk. The resulting curve is self-overlapping. We show how to test whether a given curve is self-overlapping, and how to count how many essentially different stretchings of the disk could give rise to the same curve.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

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