Hinged Dissection of Polyominoes and Polyforms
Abstract
A hinged dissection of a set of polygons S is a collection of polygonal pieces hinged together at vertices that can be folded into any member of S. We present a hinged dissection of all edge-to-edge gluings of n congruent copies of a polygon P that join corresponding edges of P. This construction uses kn pieces, where k is the number of vertices of P. When P is a regular polygon, we show how to reduce the number of pieces to ceiling(k/2)*(n-1). In particular, we consider polyominoes (made up of unit squares), polyiamonds (made up of equilateral triangles), and polyhexes (made up of regular hexagons). We also give a hinged dissection of all polyabolos (made up of right isosceles triangles), which do not fall under the general result mentioned above. Finally, we show that if P can be hinged into Q, then any edge-to-edge gluing of n congruent copies of P can be hinged into any edge-to-edge gluing of n congruent copies of Q.
Keywords
Cite
@article{arxiv.cs/9907018,
title = {Hinged Dissection of Polyominoes and Polyforms},
author = {Erik D. Demaine and Martin L. Demaine and David Eppstein and Greg N. Frederickson and Erich Friedman},
journal= {arXiv preprint arXiv:cs/9907018},
year = {2007}
}
Comments
27 pages, 39 figures. Accepted to Computational Geometry: Theory and Applications. v3 incorporates several comments by referees. v2 added many new results and a new coauthor (Frederickson)