Paper by Erik D. Demaine

Reference:

Erik D. Demaine and Martin L. Demaine, “Adventures in Maze Folding Art”, Journal of Information Processing, volume 28, 2020, pages 745–749.

BibTeX

@Article{MazeArt_JIP,
  AUTHOR        = {Erik D. Demaine and Martin L. Demaine},
  TITLE         = {Adventures in Maze Folding Art},
  JOURNAL       = {Journal of Information Processing},
  journalurl    = {http://www.ipsj.or.jp/english/jip/},
  VOLUME        = 28,
  YEAR          = 2020,
  PAGES         = {745--749},

  length        = {5 pages},
  paperkind     = {invited paper},
  webpages      = {fonts},
  doi           = {https://dx.doi.org/10.2197/ipsjjip.28.745},
  dblp          = {https://dblp.org/rec/journals/jip/DemaineD20},
  comments      = {This paper is available from <A HREF="https://doi.org/10.2197/ipsjjip.28.745">J-STAGE</A>.},
}

Abstract:

Every orthogonal graph, extruded orthogonally from a rectangle, can be folded from a rectangle of paper a constant factor larger. This computational origami result was proved a decade ago, and has since enabled the design of a mathematical/puzzle font and a variety of art prints. Here we survey the maze-folding art prints we have designed.

Comments:

This paper is available from J-STAGE.

Length:

The invited paper is 5 pages.

Availability:

The invited paper is available in PDF (1052k).

See information on file formats.

[Google Scholar search]

Related webpages:

Mathematical and Puzzle Fonts/Typefaces