Content deleted Content added
→Tiles: ce |
→Tiles: ce |
||
Line 12:
==Tiles==
A [[Tessellation|tiling]] of a [[surface]] is a covering of the surface by [[geometric shape]]s, called tiles, with no overlaps and no gaps. An example is the familiar tiling of the [[Euclidean plane]] by [[square]]s, meeting edge-to-edge. When all the tiles have the same shape (they are all [[Congruence (geometry)|congruent]]), the tiling is called a [[monohedral tiling]], and the shape of the tiles is called the [[prototile]] of the tiling.{{r|adams}} The binary tilings are monohedral tilings of the [[hyperbolic plane]], a kind of [[non-Euclidean geometry]] with different notions of length, area, congruence, and symmetry than the Euclidean plane.{{r|radin}} Two common models for the hyperbolic plane are the [[Poincaré disk model]] and [[Poincaré half-plane model]]. In these, the points of the hyperbolic plane are modeled by points in the
In one version of binary tiling, each tile is a shape bounded by two hyperbolic lines and two horocycles. These four curves are asymptotic to the same ideal point, and the two horocycles have hyperbolic distance <math>\log 2</math> from each other. The resulting shape has four right angles, like a rectangle, with its sides alternating between segments of hyperbolic lines and arcs of horocycles. The choice of <math>\log 2</math> as the distance between the two horocycles causes one of the two arcs of horocycles (the one farther from the asymptotic point) to have twice the hyperbolic length of the opposite arc. Copies of this shape, meeting edge-to-edge along their line segment sides, can tile the slab or crescent shaped region between two horocycles. A nested family of these slabs or crescents can then tile the entire hyperbolic plane, lined up so that the long arc of each tile in one slab is covered by the short arcs of two tiles in the next slab. The result is a binary tiling.{{r|df}}
| |||