tiling

Different-shape polygons can cover planes {tiling, geometry} with no gaps and no overlaps.

shapes

One triangle, square, or hexagon shape can tile. One pentagon shape cannot tile.

Pairs of shapes can tile, such as two different irregular pentagons. Such tilings have repeated parallelograms {periodic tiling}.

Spirals can tile without repeated parallelogram {aperiodic tiling}. For example, nine-sided triangle-shaped tile {versatile} can tile periodically and non-periodically. Square-shaped tiles with protruding points and corresponding concave depressions can tile aperiodically. Other four-sided shapes {Penrose tiles} have protrusions and depressions, have five-fold symmetry, make repeated patterns, and can tile aperiodically {quasi-periodic tiling}.

periodicity

Algorithms can decide if tiles can tile the plane periodically. No algorithm can decide generally if tiles can tile the plane aperiodically.

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Mathematical Sciences>Geometry>Plane>Tiling

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Date Modified: 2022.0224