8 vertices of polyhedron
0 extreme rays of recession cone
6 support hyperplanes of polyhedron (homogenized)

dual f-vector orbits:
1 1 1 1 1 

embedding dimension = 4
affine dimension of the polyhedron = 3 (maximal)
rank of recession monoid = 0 (polyhedron is polytope)

dehomogenization:
0 0 0 1 


volume (lattice normalized) = 6
volume (Euclidean) = 1

Euclidean automorphism group has order 48 (possibly approximation if very large)
Integrality not known
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8 vertices of polyhedron:
 0 0 0 1
 0 0 1 1
 0 1 0 1
 0 1 1 1
 1 0 0 1
 1 0 1 1
 1 1 0 1
 1 1 1 1

0 extreme rays of recession cone:

6 support hyperplanes of polyhedron (homogenized):
 -1  0  0 1
  0 -1  0 1
  0  0 -1 1
  0  0  1 0
  0  1  0 0
  1  0  0 0