- [3,3,3]+,
order 60, or its
doubling [[3,3,3]]+,
order 120,
defining an
omnisnub 5-cell
which is
listed for completeness, but is not uniform. This family...
- with a
phyllic disphenoid vertex figure.
Centered on
hexagonal prism The
omnisnub icosahedral honeycomb, h(t0,1,2,3{3,5,3}), , has snub dodecahedron, octahedron...
-
symmetry of [[3,3,3]+],
order 120.
Vertex figure The full snub 5-cell or
omnisnub 5-cell,
defined as an
alternation of the
omnitruncated 5-cell,
cannot be...
-
Knowledge Lab for the 2006
Bridges Conference. The full snub 120-cell or
omnisnub 120-cell,
defined as an
alternation of the
omnitruncated 120-cell, can...
- the
truncated cuboctahedron in 4 dimensions. The full snub
tesseract or
omnisnub tesseract,
defined as an
alternation of the
omnitruncated tesseract, can...
- In the
geometry of
hyperbolic 3-space, the cubic-octahedral
honeycomb is a
compact uniform honeycomb,
constructed from cube, octahedron, and cuboctahedron...
- family,
although it is a full snub or
omnisnub within the D4 family, as . In
contrast a full snub 24-cell or
omnisnub 24-cell,
defined as an alternation...
-
vertex figure. The
alternated omnitruncated square tiling honeycomb (or
omnisnub square tiling honeycomb), h(t0,1,2,3{4,4,3}), has snub
square tiling, snub...
- centers, and the cube center. An
alternated omnitruncated cubic honeycomb or
omnisnub cubic honeycomb can be
constructed by
alternation of the omnitruncated...
-
omnitruncated 5-cell. ∪ ∪ ∪ ∪ = dual of This
honeycomb can be alternated,
creating omnisnub 5-cells with
irregular 5-cells
created at the
deleted vertices. Although...
