(Non)Existence of Pleated Folds: How Paper Folds Between Creases

Author(s)

Demaine, Erik D.; Demaine, Martin L.; Hart, Vi; Price, Gregory N.; Tachi, Tomohiro

Abstract

We prove that the pleated hyperbolic paraboloid, a familiar origami model known since 1927, in fact cannot be folded with the standard crease pattern in the standard mathematical model of zero-thickness paper. In contrast, we show that the model can be folded with additional creases, suggesting that real paper “folds” into this model via small such creases. We conjecture that the circular version of this model, consisting simply of concentric circular creases, also folds without extra creases. At the heart of our results is a new structural theorem characterizing uncreased intrinsically flat surfaces—the portions of paper between the creases. Differential geometry has much to say about the local behavior of such surfaces when they are sufficiently smooth, e.g., that they are torsal ruled. But this classic result is simply false in the context of the whole surface. Our structural characterization tells the whole story, and even applies to surfaces with discontinuities in the second derivative. We use our theorem to prove fundamental properties about how paper folds, for example, that straight creases on the piece of paper must remain piecewise-straight (polygonal) by folding.

Date issued

2011-03

URI

http://hdl.handle.net/1721.1/73839

Department

Lincoln Laboratory
Massachusetts Institute of Technology. Computer Science and Artificial Intelligence Laboratory
Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science

Journal

Graphs and Combinatorics

Publisher

Springer Japan

Citation

Demaine, Erik D. et al. “(Non)Existence of Pleated Folds: How Paper Folds Between Creases.” Graphs and Combinatorics 27.3 (2011): 377–397.

Version: Author's final manuscript

ISSN

0911-0119

1435-5914