R70.3

Statistics

genus c70, orientable
Schläfli formula c{5,11}
V / F / E c 60 / 132 / 330
notesreplete singular
vertex, face multiplicity c1, 1
Petrie polygons
holes
2nd-order Petrie polygons
3rd-order holes
3rd-order Petrie polygons
4th-order holes
4th-order Petrie polygons
5th-order holes
5th-order Petrie polygons
165, each with 4 edges
110, each with 6 edges
55, each with 12 edges
60, each with 11 edges
55, each with 12 edges
220, each with 3 edges
66, each with 10 edges
132, each with 5 edges
66, each with 10 edges
rotational symmetry groupPSL(2,11), with 660 elements
full symmetry group1320 elements.
its presentation c< r, s, t | t2, (rs)2, (rt)2, (st)2, r‑5, s‑1r‑1sr2sr‑1s‑1, (rs‑1)6, (s‑2rs‑1)3  >
C&D number cR70.3
The statistics marked c are from the published work of Professor Marston Conder.

Relations to other Regular Maps

Its dual is R70.3′.

Its Petrie dual is N107.1.

Its 2-hole derivative is R81.62.
Its 4-hole derivative is R26.2.
Its 5-hole derivative is R70.4.

List of regular maps in orientable genus 70.


Other Regular Maps

General Index