



genus ^{c}  3, orientable 
Schläfli formula ^{c}  {8,4} 
V / F / E ^{c}  8 / 4 / 16 
notes  
vertex, face multiplicity ^{c}  2, 4 
4, each with 8 edges 16, each with 2 edges  
antipodal sets  4 of ( 2v ), 2 of ( 2f ), 8 of ( 2e ) 
rotational symmetry group  32 elements. 
full symmetry group  64 elements. 
its presentation ^{c}  < r, s, t  t^{2}, s^{4}, (sr)^{2}, (sr^{‑1})^{2}, (st)^{2}, (rt)^{2}, r^{8} > 
C&D number ^{c}  R3.6′ 
The statistics marked ^{c} are from the published work of Professor Marston Conder. 
Its dual is
It is selfPetrie dual.
It is a 2fold cover of
It can be 3split to give
It can be 5split to give
It can be 7split to give
It can be 9split to give
It can be 11split to give
It can be rectified to give
It is the result of rectifying
It is a member of series l.
List of regular maps in orientable genus 3.
Its skeleton is 2 . 8cycle.
Orientable  
Nonorientable 
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