References
- [Berger 66] R. Berger. “The Undecidability of the Domino Problem.” Mem. Amer. Math. Soc. No. 66 (1966), 72.
- [DeWeese 08] M. DeWeese. “Personal Communication.” (2008).
- [Fontaine 91] A. Fontaine. “An Infinite Number of Plane Figures with Heesch Number Two.” J. Combin. Theory Ser. A 57(1) (1991), 151–156.
- [Goodman-Strauss 99] C. Goodman-Strauss. “A Small Aperiodic Set of Planar Tiles.” Eur. J. Combin. 20(5) (1999), 375–384.
- [Goodman-Strauss 00] C. Goodman-Strauss. “Open Problems in Tiling.” Available online http://comp.uark.edu/∼strauss/papers/survey.pdf, 2000.
- [Grünbaum and Shephard 87] B. Grünbaum and G. C. Shephard. Tilings and Patterns. New York, NY: W. H. Freeman and Company, 1987.
- [Grünbaum and Shephard 98] G. Grünbaum and G. C. Shephard. “Some Problems on Plane Tilings.” In Mathematical Recreations, edited by D. A. Klarner, pp. 167–196. Dover, 1998.
- [Heesch 68] H. Heesch. Reguläres Parkettierungsproblem. Arbeitsgemeinschaft für Forschung des Landes Nordrhein-Westfalen, Heft 172. Cologne: Westdeutscher Verlag, 1968.
- [Mann 01] C. Mann. “Heesch’s Problem and Other Tiling Problems.” PhD thesis, University of Arkansas, 2001.
- [Mann 04] C. Mann. “Heesch’s Tiling Problem.” Amer. Math. Monthly 111(6) (2004), 509–517.
- [Myers 12] J. Myers. “Polyomino, Polyhex and Polyiamond Tiling.” Available online http://www.polyomino.org.uk/mathematics/polyform-tiling/, 2012.
- [Patitz 14] M. Patitz. “Self-Assembly.” Available online http://self-assembly.net, 2014.
- [Pelesko 07] J. A. Pelesko. Self Assembly: The Science of Things That Put Themselves Together. Chapmann and Hall/CRC, 2007.
- [Penrose 80] R. Penrose. “Pentaplexity: A Class of Nonperiodic Tilings of the Plane.” Math. Intelligencer 2(1) (1979/1980), 32–37.
- [Rhoads 05] G. C. Rhoads. “Planar Tilings by Polyominoes, Polyhexes, and Polyiamonds.” J. Comput. Appl. Math. 174(2) (2005), 329–353.
- [Robinson 71] R. M. Robinson. “Undecidability and Nonperiodicity of Tilings of the Plane.” Inventiones Math 12 (1971), 177–909.
- [Socolar and Taylor 12] J. E. S. Socolar and J. M. Taylor. “Forcing Nonperiodicity with a Single Tile.” Math. Intelligencer 34(1) (2012), 18–28.