Apeir octahedron

Apeir octahedron
Rank	4
Type	Regular
Notation
Schläfli symbol	${\displaystyle \{\{\infty ,3\}_{6}\#\{\},\{3,4\}\}}$
Elements
Cells	∞ blended Petrial hexagonal tilings
Faces	NM  zigzags
Edges	3NM
Vertices	2NM
Vertex figure	Octahedron
Related polytopes
Petrie dual	Petrial apeir octahedron
Abstract & topological properties
Schläfli type	{∞,3,4}
Properties
Convex	No

The apeir octahedron is a regular skew tetracomb in 4-dimensional Euclidean space. It can be constructed by applying the apeir operation to the octahedron.