Acronym ...
Name complex honeycomb x4-3-o4-4-o2,
complex honeycomb o4-3-x4-3-o4
Vertex figure x4-4-o2
Dual x2-4-o4-3-o4
Confer
general polytopal classes:
complex polytopes  
External
links
wikipedia  

When seen as rectification of x4-3-o4-3-o4, then it uses the former edge count as vertex count, and the faces are the (selfdual) former faces as well as the former vertex figures.


Incidence matrix according to Dynkin symbol

x4-3-o4-4-o2   (N → ∞)

.    .    .  | 3N   16 | 8
-------------+----+-----+--
x4   .    .  |  4 | 12N | 2
-------------+----+-----+--
x4-3-o4   .   24 |  24 | N

o4-3-x4-3-o4   (N → ∞)

.    .    .  | 6N   16 | 4 4
-------------+----+-----+----
.    x4   .  |  4 | 24N | 1 1
-------------+----+-----+----
o4-3-x4   .   24 |  24 | N *
.    x4-3-o4  24 |  24 | * N

© 2004-2024
top of page