genus ^{c} | 9, non-orientable |

Schläfli formula ^{c} | {3,8} |

V / F / E ^{c} | 21 / 56 / 84 |

notes | |

vertex, face multiplicity ^{c} | 1, 1 |

24, each with 7 edges | |

rotational symmetry group | SL(2,7), with 336 elements |

full symmetry group | SL(2,7), with 336 elements |

its presentation ^{c} | < r, s, t | t^{2}, r^{‑3}, (rs)^{2}, (rt)^{2}, (st)^{2}, s^{8}, s^{‑1}rs^{‑2}rs^{‑1}rs^{2}r^{‑1}st > |

C&D number ^{c} | N9.1 |

The statistics marked ^{c} are from the published work of Professor Marston Conder. |

Its Petrie dual is

It can be 2-split to give

List of regular maps in non-orientable genus 9.

Orientable | |

Non-orientable |