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| genus c | 0, orientable |
| Schläfli formula c | {13,2} |
| V / F / E c | 13 / 2 / 13 |
| notes | 
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| vertex, face multiplicity c | 1, 13 |
| 1, each with 26 edges | |
| antipodal sets | 13 of ( v, e ), 1 of ( 2f ) |
| rotational symmetry group | D26, with 26 elements |
| full symmetry group | D52, with 52 elements |
| its presentation c | < r, s, t | r2, s2, t2, (rs)13, (st)2, (rt)2 >. |
| C&D number c | R0.n13′ |
| The statistics marked c are from the published work of Professor Marston Conder. | |
Its dual is
Its Petrie dual is the regular map with C&D number N1.n13p.
It can be rectified to give
Other regular maps in the same manifold.
If we ignore its faces and regard it as a graph, it is isomorphic to 13-cycle.
| C13 |
| Orientable | |
| Non-orientable |
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