80, each with 15 edges
60, each with 20 edges
100, each with 12 edges
40, each with 30 edges
200, each with 6 edges
300, each with 4 edges
300, each with 4 edges
120, each with 10 edges
120, each with 10 edges
120, each with 10 edges
| genus c | 101, orientable |
| Schläfli formula c | {4,12} |
| V / F / E c | 100 / 300 / 600 |
| notes |
|
| vertex, face multiplicity c | 1, 1 |
| 120, each with 10 edges 80, each with 15 edges 60, each with 20 edges 100, each with 12 edges 40, each with 30 edges 200, each with 6 edges 300, each with 4 edges 300, each with 4 edges 120, each with 10 edges 120, each with 10 edges 120, each with 10 edges | |
| rotational symmetry group | A5 ⋊ (C5 ⋊ C4), with 1200 elements |
| full symmetry group | 1200 elements. |
| its presentation c | < r, s | r4, (rs)2, (rs‑3rs‑1)2, s12, s‑1r‑1srs‑1rs‑2r‑2s3r‑1s‑2, srs‑1r‑1srs‑2r‑1sr‑1s‑1rs2r‑1 > |
| C&D number c | C101.8 |
| The statistics marked c are from the published work of Professor Marston Conder. | |
It is its own 5-hole derivative.
It is its own 5-hole derivative.
It is its own 5-hole derivative.
List of regular maps in orientable genus 101.
| Orientable | |
| Non-orientable |