R69.1

Statistics

genus c69, orientable
Schläfli formula c{3,9}
V / F / E c 272 / 816 / 1224
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
136, each with 18 edges
272, each with 9 edges
153, each with 16 edges
272, each with 9 edges
153, each with 16 edges
612, each with 4 edges
153, each with 16 edges
rotational symmetry groupPSL(2,17), with 2448 elements
full symmetry group4896 elements.
its presentation c< r, s, t | t2, r‑3, (rs)2, (rt)2, (st)2, s‑9, (rs‑3)4  >
C&D number cR69.1
The statistics marked c are from the published work of Professor Marston Conder.

Relations to other Regular Maps

Its dual is R69.1′.

List of regular maps in orientable genus 69.


Other Regular Maps

General Index