User:Tomruen/Versatile (geometry)

In geometry, a versatile is a polygon that can express a monohedral tiling in many possible ways, periodically or aperiodically. The polygons may be equilateral or not, convex or not, connected edge-to-edge or not. The regular polygons, the square, equilateral triangle and regular hexagon do not qualify as a versatile because they only self-tile in one way.

The term was coined by Michael Hirschhorn in 1977, ^[1] and used in 1979 by Branko Grünbaum and Geoffrey Colin Shephard in spiral tilings^[2] and expanded in 1981 by Marjorie Rice and Doris Schattschneider.^[3] for wider aperiod tiles.

All examples below are selected to each be able to fill a regular polygon, although that is not a requirement.

Quadrilateral examples[edit]

A reflexed pentagon, or crown tile	This equilateral pentagon can be seen as the union of a 30° rhombus and and equilateral triangle.	Hirschhorn pentagon. The pentagon can be seen as the union of an 80° rhombus and an equilateral triangle.^[4]
Dissection of regular decagon with ten reflexed pentagons.	Twelve can tile a regular dodecagon	18 Hirschhorn pentagons can dissect a regular octadecagon

A shield tile, a union of a square and triangles on to adjacent edges. It can also be constructed as two reflexed pentagons.
Six of them can tile a regular dodecagon.
Reflexed hexagon
Six of them can tile a large hexagon.
Skew concave hexagon as union of two rhombi
Six of them can tile a decagon
Decagon as union of 2 Penrose tiling rhombi
20 hexagons in a decagon

^ Michael Hirschhorn, Tessellations with convex equilateral pentagons (Parabola 13, 1977, 2-5,20-22)
^ Spiral Tilings and Versatiles, Grünbaum B. and Shephard G.C., Mathematics Teaching, No.88. Sept. 1979, pp.50-51
^ The Incredible Pentagonal Versatile, Marjorie Rice & Doris Schattschneider, Mathematics Teaching 93 52-53, 1980
^ Equilateral Convex Pentagons Which Tile the Plane, M.D. Hirshhorn, D.C. Hunt, JOURNAL OF COMBINATORIAL THEORY, Series A 39, l-18 (1985) [1]