S11:{24,24}₄

genus ^c	11, orientable
Schläfli formula ^c	{24,24}
V / F / E ^c	2 / 2 / 24
notes
vertex, face multiplicity ^c	24, 24
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 6th-order holes 6th-order Petrie polygons 7th-order holes 7th-order Petrie polygons 8th-order holes 8th-order Petrie polygons 9th-order holes 9th-order Petrie polygons 10th-order holes 10th-order Petrie polygons 11th-order holes 11th-order Petrie polygons 12th-order holes 12th-order Petrie polygons	12, each with 4 edges 4, each with 12 edges 24, each with 2 edges 6, each with 8 edges 12, each with 4 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges INF, each with 0 edges
rotational symmetry group	48 elements.
full symmetry group	96 elements.
its presentation ^c	< r, s, t \| t², (rs)², (rt)², (st)², sr³sr^‑1, srs^‑1rs², r^‑1s²r^‑9 >
C&D number ^c	R11.13
The statistics marked ^c are from the published work of Professor Marston Conder.

It can be rectified to give R11.2′.

It is a member of series η° .

Other Regular Maps