Apeir ❴4,6∣3❵
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Apeir {4,6|3} | |
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Rank | 4 |
Dimension | 4 |
Type | Regular |
Elements | |
Cells | ∞ Petrial blended square tilings |
Faces | ∞ zigzags |
Edges | ∞ |
Vertices | ∞ |
Vertex figure | {4,6∣3} |
Related polytopes | |
Petrie dual | Apeir {10,6}4,3 |
Abstract & topological properties | |
Schläfli type | {∞,4,6} |
Properties | |
Flag orbits | 1 |
Convex | No |
Dimension vector | (0,3,2,3) |
The apeir {4,6|3} is a regular apeirochoron in 4-dimensional space. It is the apeir of {4,6|3}. Since {4,6|3} has a rational coordinate representation its apeir is discrete.
Vertex coordinates[edit | edit source]
This polytope is missing vertex coordinates.(August 2024) |