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| genus c | 0, orientable |
| Schläfli formula c | {2,2} |
| V / F / E c | 2 / 2 / 2 |
| notes | 
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| vertex, face multiplicity c | 2, 2 |
| antipodal sets | 1 of ( 2v ), 1 of ( 2f ), 1 of ( 2e ) |
| rotational symmetry group | C2×C2, with 4 elements |
| full symmetry group | C2×C2×C2, with 8 elements |
| its presentation c | < r, s, t | r2, s2, t2, (rs)2, (st)2, (rt)2 >. |
| C&D number c | R0.n2 |
| The statistics marked c are from the published work of Professor Marston Conder. | |
It is self-dual.
It is self-Petrie dual.
It is a 2-fold cover of
It can be split to give
It can be built by splitting
It can be rectified to give
It is the diagonalisation of
Its half shuriken is
It is a member of series k.
Other regular maps in the same manifold.
If we ignore its faces and regard it as a graph, it is isomorphic to 2-cycle.
| C2×C2 |
| Orientable | |
| Non-orientable |
The images on this page are copyright © 2010 N. Wedd