Abstract
In their book Turtle Geometry, Abelson and diSessa formulate and prove the POLY Closing Theorem, which gives an exact condition for when a path produced by the POLY program closes (initial and final turtle position are equal) properly (initial and final turtle heading are equal). The POLY program repeats a translation (Move command) followed by a rotation (Turn command). Their Looping Lemma states that any repeated turtle program is rotation-symmetry equivalent to a POLY program. The POLY Closing Theorem and Looping Lemma are useful in understanding and creating artistic motifs because repeating the same turtle program so that it closes properly, leads to a rotationally symmetric path. In this article, we generalize their result to 3D. A surprising corollary is that when repeating a non-closed non-proper turtle program, its path is closed if and only if it is proper.
| Original language | English |
|---|---|
| Title of host publication | Proceedings of Bridges 2023 |
| Subtitle of host publication | Mathematics, Art, Music, Architecture, Culture |
| Editors | Judy Holdener, Eve Torrence, Chamberlain Fong, Katherine Seaton |
| Publisher | Tessellations Publishing |
| Pages | 425-428 |
| Number of pages | 4 |
| ISBN (Print) | 978-1-938664-45-8 |
| Publication status | Published - 17 Jul 2023 |
| Event | 26th Annual Bridges Conference: Mathematics, Art, Music, Architecture, Culture - Dalhousie University, Halifax, Canada Duration: 27 Jul 2023 → 31 Jul 2023 Conference number: 26 https://www.bridgesmathart.org/b2023/ |
Publication series
| Name | Bridges Conference Proceedings |
|---|---|
| Publisher | Tesselations Publishing |
| ISSN (Print) | 1099-6702 |
Conference
| Conference | 26th Annual Bridges Conference |
|---|---|
| Abbreviated title | Bridges Halifax 2023 |
| Country/Territory | Canada |
| City | Halifax |
| Period | 27/07/23 → 31/07/23 |
| Internet address |