OFFSET
0,3
COMMENTS
These are "free polyforms" because they are counted up to rotation and reflection.
The triangular pyramidille is dual to the cantitruncated cubic honeycomb.
The polyhedral cells are each 1/24 of a cube and are similar to the convex hull of (0,0,0), (2,0,0), (1,1,0), and (1,1,1).
LINKS
Wikipedia, Architectonic and catoptric tessellation
Wikipedia, Cubic honeycomb
CROSSREFS
Cf. A038119 (cubic), A038173 (rhombic dodecahedral), A038181 (truncated octahedral), A343909 (tetrahedral-octahedral), A365654 (square bipyramidal), A384254 (rectified cubic), A384274 (quarter cubic), A384754 (omnitruncated cubic), A385024 (tetragonal disphenoidal), A385025 (gyrobifastigium), A385026 (hexagonal prismatic), A385027 (triakis truncated tetrahedral), A385267 (half pyramidille), A385268 (oblate cubille), A385269 (quarter cubille), A385270 (elongated dodecahedral), A385271 (hexakis cubic), A385272 (phyllic disphenoidal), A385273 (quarter oblate octahedrille), A385274 (rhombic pyramidal), A385275 (square quarter pyramidille), A385276 (trapezo-rhombic dodecahedral), A385277 (triangular prismatic).
KEYWORD
nonn,hard,more
AUTHOR
Peter Kagey and Bert Dobbelaere, Jun 25 2025
STATUS
approved
