Paper by Martin L. Demaine

Reference:

Yasuhiko Asao, Erik D. Demaine, Martin L. Demaine, Hideaki Hosaka, Akitoshi Kawamura, Tomohiro Tachi, and Kazune Takahashi, “Folding and Punching Paper”, Journal of Information Processing, volume 25, 2017, pages 590–600. Special issue of papers from the 19th Japan Conference on Discrete and Computational Geometry, Graphs, and Games

Abstract:

We show how to fold a piece of paper and punch one hole so as to produce any desired pattern of holes. Given n points on a piece of paper (finite polygon or infinite plane), we give algorithms to fold the paper flat so that those n points and no other points of paper map to a common location, so that punching one hole and unfolding produces exactly the desired pattern of holes. Furthermore, we can forbid creases from passing through the points (allowing noncircular hole punches). Our solutions use relatively few creases (in some cases, polynomially many), and can be expressed as a linear sequence of folding steps of complexity O(1)—a generalization of simple folds which we introduce.

Comments:

This paper is also available from J-STAGE.

Length:

The paper is 11 pages.

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