| 3-4-3-12 tiling | ||
|---|---|---|
| Type | 2-uniform tiling | |
| Vertex configuration | 3.4.3.12 and 3.12.12 | |
| Symmetry | p4m, [4,4], (*442) | |
| Rotation symmetry | p4, [4,4]+, (442) | |
| Properties | 2-uniform, 3-isohedral, 3-isotoxal |
The 3.12.12 vertex figure alone generates a truncated hexagonal tiling, while the 3.4.3.12 only exists in this 2-uniform tiling. There are 2 3-uniform tilings that contain both of these vertex figures among one more.
It has square symmetry, p4m, [4,4], (*442). It is also called a demiregular tiling by some authors.
This 2-uniform tiling can be used as a circle packing. Cyan circles are in contact with 3 other circles (1 cyan, 2 pink), corresponding to the V3.122 planigon, and pink circles are in contact with 4 other circles (2 cyan, 2 pink), corresponding to the V3.4.3.12 planigon. It is homeomorphic to the ambo operation on the tiling, with the cyan and pink gap polygons corresponding to the cyan and pink circles (one dimensional duals to the respective planigons). Both images coincide.
The dual tiling has kite ('ties') and isosceles triangle faces, defined by face configurations: V3.4.3.12 and V3.12.12. The kites meet in sets of 4 around a center vertex, and the triangles are in pairs making planigon rhombi. Every four kites and four isosceles triangles make a square of side length
2+\sqrt{3}
It has 2 related 3-uniform tilings that include both 3.4.3.12 and 3.12.12 vertex figures:
This tiling can be seen in a series as a lattice of 4n-gons starting from the square tiling. For 16-gons (n=4), the gaps can be filled with isogonal octagons and isosceles triangles.