C19.2

genus ^c	19, orientable
Schläfli formula ^c	{8,8}
V / F / E ^c	18 / 18 / 72
notes
vertex, face multiplicity ^c	1, 1
Petrie polygons	24, each with 6 edges
rotational symmetry group	144 elements.
full symmetry group	144 elements.
its presentation ^c	< r, s \| (rs)², r⁸, s^‑2r³s^‑1rs^‑1 >
C&D number ^c	C19.2
The statistics marked ^c are from the published work of Professor Marston Conder.

It can be 3-split to give C73.9′.

	×	{4,4}_(3,3)		unconfirmed
	×	{4,4}_(3,3)		or maybe R19.25. Unconfirmed

Other Regular Maps