User:Harry Princeton/Ambo Operations and Uniform Circle Packings

Uniform packings
There are 11 circle packings based on the 11 uniform tilings of the plane. In these packings, every circle can be mapped to every other circle by reflections and rotations. The hexagonal gaps can be filled by one circle and the dodecagonal gaps can be filled with 7 circles, creating 3-uniform packings. The truncated trihexagonal tiling with both types of gaps can be filled as a 4-uniform packing. These operations are conjugate to polygon dissections and act as dual insets. The snub hexagonal tiling has two mirror-image forms. In fact, the fundamental domains of such Archimedean circle packings are the planigons. Moreover, a circle of radius $$1/2$$ can be inscribed in every planigon for $$k$$-uniform circle packings, because the dual vertex figure consists of segments of length $$1/2$$ emanating from the vertex. This follows from the fact that the edges of the dual uniform tilings intersect the edges of the uniform tilings orthogonally at midpoints (hence the $$1/2$$), as the Conway operation of dualization (or ortho) involves connecting the centroids to the midpoints of convex regular polygons. This also works for semiplanigons as well, as seen below (all to scale - caption discrepancies generated by Asymptote): Another way for seeing this for all semiplangions except the tie kite (V3.4.3.12) is as follows: a skew quadrilateral (V32.4.12) is the result of removing a sixth of a planigonal regular hexagon ('tiny triangle') from the $$60^{\circ}$$ angle of the planigonal scalene right triangle (kisrhombille tiling); an isosceles trapezoid (V32.62), planigonal Floret pentagon, planigonal rhombus, and planigonal equilateral triangle all result from adding a number tiny triangles to a planigonal regular hexagon (Floret pentagonal, rhombille, deltille tilings); and a right trapezoid (V3.42.6) is the result of adding a tiny triangle to a prismatic pentagon (prismatic pentagonal tiling). These external tiny triangular additions (or removal) preserve the cocyclic nature of the polygons, and the inscribed circle's radius remains the same in all cases:

k-Uniform Circle Packing Examples
The 5th Krotenheerdt 4-uniform tiling [32.4.12; 32.12; 32.4.3.4; 36] (a gem-like tiling whose dual is gem-like as well) is circle-packed below, with each circle and corresponding dual planigon/semiplangion sharing the same color. Also shown are the original tiling, the ambo tiling, and the dual tiling. The uniform ambo tiling is made by connecting the midpoints of all regular polygons, and the spaces in between are the vertex-figure polygons (1-D duals to the planigons/semiplangions by interchanging vertices and edges), and it is homeomorphic to the uniform circle packing by means of circumscribing vertex figure polygons (and plasmolysing regular polygons), or conversely by taking the convex hulls of the gaps between the circles (and inscribing vertex-figure polygons with its own vertices at tangential points). The vertex-figure polygons are also colored according to the corresponding plangions/semiplanigons. All images and colors coincide. A circle packing and ambo operation is done on the 7-uniform Krotenheerdt 2 tiling, All circles, colors, planigons/semiplangions, polygons, and vertex figure polygons coincide, with the same scale. Finally, the same treatment is done to a 92-uniform tiling, which consists of 14 vertex figures (and whose dual consists of 14 plangions). This is the maximum number of types of vertices (resp. plangions) allowed in any uniform tiling (resp. dual uniform tiling). All circles, colors, planigons/semiplangions, polygons, and vertex figure polygons coincide, but the scale is shrunk to $$1/2$$. Finally, we could have many non-uniform radial circle packings, but with only two types of circles (V33.42; V32.4.3.4). One of them is shown below, along with the homeomorphic ambo tiling: