spacetiling

Spacetiling, also referred to as space tiling, is the partition of Euclidean space into a set of non-overlapping cells that completely cover the space. A tiling is periodic if it repeats under translations; otherwise it may be aperiodic. In two dimensions, common examples include the square tiling, the equilateral triangular tiling, and the hexagonal tiling. In three dimensions, space tilings include the cubic honeycomb by cubes, the tetrahedral-octahedral honeycomb, and tilings by rhombic dodecahedra or truncated octahedra. Some tilings are face-to-face, meaning every shared boundary between adjacent tiles is a full face of both tiles.

Constructing tilings can involve lattice-based methods, such as Voronoi or Delone tilings derived from a point

Applications of spacetiling appear in crystallography, where atomic arrangements approximate tilings of space, in computer graphics