genus c | 90, orientable |
Schläfli formula c | {210,14} |
V / F / E c | 30 / 2 / 210 |
notes | |
vertex, face multiplicity c | 7, 210 |
14, each with 30 edges | |
rotational symmetry group | 420 elements. |
full symmetry group | 840 elements. |
its presentation c | < r, s, t | t2, (sr)2, (st)2, (rt)2, rs3rs‑1, s14, r15s2r15 > |
C&D number c | R90.8′ |
The statistics marked c are from the published work of Professor Marston Conder. |
Its Petrie dual is
It can be built by 2-splitting
It can be built by 3-splitting
It can be built by 5-splitting
List of regular maps in orientable genus 90.
Orientable | |
Non-orientable |