Abstract
Although the art of tiling is as old as human history, the science of tiling seems to have been curiously neglected until recent times.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
Similar content being viewed by others
References and Further Reading
Several collections of Escher’s works have been published; the most extensive is The World of M. C. Escher (Abrams, New York, 1971). A very interesting account of Escher and his tilings is given in B. Ernst’s book The Magic Mirror of M. C. Escher (Random House, New York, 1976). A discussion of the tilings to be found in the Alhambra appears in E. Müller, “Gruppentheoretische Ornamente aus der Alhambra in Grenada” (ETH dissertation, Zürich, 1944). Kepler’s book Harrnonice Mundi, originally published in Linz in 1619, has been reprinted in Kepler’s Complete Works, edited by M. Caspar (Gesammelte Werke, Band VI, Beck, München, 1940 and by Culture et Civilisation, Bruxelles, 1968). These texts are in Latin; a German translation, Weltharmonik, by M. Caspar has also been published (Oldenbourg, München, 1967).
The three types of hexagons that admit tilings of the plane were determined by K. Reinhardt in his thesis “Über die Zerlegung der Ebene in Polygone”, Frankfurt University, 1918 (Noske, Leipzig, 1918). Kershner’s paper is “On paving the plane”, American Mathematical Monthly 75 (1968), 839–844; our list of pentagons is taken from D. Schattschneider, “Tiling the plane with congruent pentagons”, Mathematics Magazine 51 (1978), 29–44.
The three types of hexagons that admit tilings of the plane were determined by K. Reinhardt in his thesis “Über die Zerlegung der Ebene in Polygone”, Frankfurt University, 1918 (Noske, Leipzig, 1918). Kershner’s paper is “On paving the plane”, American Mathematical Monthly 75 (1968), 839–844; our list of pentagons is taken from D. Schattschneider, “Tiling the plane with congruent pentagons”, Mathematics Magazine 51 (1978), 29–44. The announcement by M. D. Hirschhorn and D. C. Hunt that the list of equilateral pentagons is complete also appears in the Mathematics Magazine 51 (1978), p. 312.
The subject of k-morphic tilings is considered in the authors’ “Patch-determined tilings”, Mathematical Gazette 61 (1977), 31–38, and Harborth’s example in “Prescribed numbers of tiles and tilings”, Mathematical Gazette 61 (1977), 296–299.
Hilbert’s famous problems were printed (English translation) in “Mathematical Problems”, Bulletin of the American Mathematical Society 8 (1902), 437–479 and reprinted in “Mathematical Developments Arising from Hilbert Problems”, Proc. Sympos. Pure Math., Vol. 28, (American Math. Soc, Providence, R.I., 1976). The book by Heesch and Kienzle is Flächenschluss (Springer-Verlag, Berlin-Göttingen-Heidelberg, 1963). A recent treatment of isohedral tilings is the authors’ “The eighty-one types of isohedral tilings in the plane”, Math. Proc. Cambridge Philos. Soc. 82 (1977), 177–196.
A proof of the Extension Theorem will appear in the authors’ book mentioned below. Heesch’s problem appears in his book Reguläres Parkettierungsproblem (Westdeutscher Verlag, Köln-Opladen, 1968).
Accounts of aperiodic tiles appear in R. M. Robinson’s article “Undecidability and non-periodicity of tilings of the plane”, Inventiones Math. 12 (1971), 177–209.
R. Penrose’s papers “The role of aesthetics in pure and applied mathematical research”, Bull. Inst. Math. Appl. 10 (1974), 266–271, and “Pentaplexity”, Eureka 39 (1978), 16–22. The most up-to-date account is Martin Gardner’s article cited in the text, and a more detailed exposition will appear in the author’s forthcoming book.
The connection between aperiodicity and the tiling problem is discussed in Robinson’s paper quoted above, and also in H. Wang, “Proving theorems by pattern recognition II”, Bell System Techn. Journal 40 (1961), 1–42.
Voderberg’s papers are “Zur Zerlegung der Umgebung eines ebenen Bereiches in kongruente”, J.-Ber. Deutsch. Math.-Verein. 46 (1936), 229–231, and “Zur Zerlegung der Ebene in kongruente Bereiche in Form einer Spirale”, ibid. 47 (1937), 159–160. Goldberg’s explanation of the structure of spiral tilings appears in “Central tessellations”, Scripta Math. 21 (1955), 253–260. A short article “Spiral tilings and versatiles” by the authors appeared in Mathematics Teaching 88 (1979), 50–51.
Author information
Authors and Affiliations
Editor information
Rights and permissions
Copyright information
© 1981 Wadsworth International
About this chapter
Cite this chapter
Grünbaum, B., Shephard, G.C. (1981). Some Problems on Plane Tilings. In: Klarner, D.A. (eds) The Mathematical Gardner. Springer, Boston, MA. https://doi.org/10.1007/978-1-4684-6686-7_17
Download citation
DOI: https://doi.org/10.1007/978-1-4684-6686-7_17
Publisher Name: Springer, Boston, MA
Print ISBN: 978-1-4684-6688-1
Online ISBN: 978-1-4684-6686-7
eBook Packages: Springer Book Archive