Paper by Erik D. Demaine
- Reference:
- Erik D. Demaine, Martin L. Demaine, Jenny Diomidova, Tonan Kamata, Ryuhei Uehara, and Hanyu Alice Zhang, “Any Platonic solid can transform to another by O(1) refoldings”, Computational Geometry: Theory and Applications, volume 113, 2023, pages 101995.
- Abstract:
-
We show that several classes of polyhedra are joined by a sequence of O(1)
refolding steps, where each refolding step unfolds the current polyhedron
(allowing cuts anywhere on the surface and allowing overlap)
and folds that unfolding into exactly the next polyhedron;
in other words, a polyhedron is refoldable into another polyhedron
if they share a common unfolding.
Specifically, assuming equal surface area, we prove that
(1) any two tetramonohedra are refoldable to each other,
(2) any doubly covered triangle is refoldable to a tetramonohedron,
(3) any (augmented) regular prismatoid and doubly covered regular polygon is refoldable to a tetramonohedron,
(4) any tetrahedron has a 3-step refolding sequence to a tetramonohedron, and
(5) the regular dodecahedron has a 4-step refolding sequence to a tetramonohedron.
In particular, we obtain a ≤ 6-step refolding sequence between
any pair of Platonic solids, applying (5) for the dodecahedron and
(1) and/or (2) for all other Platonic solids.
As far as the authors know, this is the first result about common unfolding
involving the regular dodecahedron.
- Comments:
- This paper is also available from ScienceDirect.
- Availability:
- The paper is available in PDF (2590k).
- See information on file formats.
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- Related papers:
- Refolding_CCCG2021 (Any Regular Polyhedron Can Transform to Another by O(1) Refoldings)
See also other papers by Erik Demaine.
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Last updated November 27, 2024 by
Erik Demaine.