CANTELLATION (GEOMETRY)

A cantellated cube - Red faces are reduced. Edges are bevelled, forming new yellow square faces. Vertices are truncated, forming new blue triangle faces.

A cantellated cubic honeycomb - Purple cubes are cantellated. Edges are bevelled, forming new blue cubic cells. Vertices are truncated, forming new red rectified cube cells.

In geometry, a 'cantellation' is an operation in any dimension that cuts a regular polytope edges and vertices, creating a new facet in place of each edge and vertex. The operation also applies to regular tilings and honeycombs.
It is represented by an extended Schläfli symbol t0,2{p,q,...}.
For polyhedra, a cantellation operation offers a direct sequence from a regular polyhedron and its dual.
This operation (for polyhedra and tilings) is also called 'expansion' by Alicia Boole Stott, as imagined by taking the faces of the regular form moving them away from the center and filling in new faces in the gaps for each opened vertex and edge.
'Example cantellation sequence between a cube and octahedron'

For higher dimensional polytopes, a cantellation offers a direct sequence from a regular polytope and its rectified form.

Contents
See also

See also



uniform polyhedron

uniform polychoron

Rectification (geometry)

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