{4,4}_(5,1)

genus ^c	1, orientable
Schläfli formula ^c	{4,4}
V / F / E ^c	26 / 26 / 52
notes
vertex, face multiplicity ^c	1, 1
Petrie polygons holes	4, each with 26 edges 4, each with 26 edges
rotational symmetry group	(C13⋊C4)×C2, with 104 elements
full symmetry group	(C13⋊C4)×C2, with 104 elements
C&D number ^c	C1.s5-1
The statistics marked ^c are from the published work of Professor Marston Conder.

It is a 2-fold cover of {4,4}_(3,2).

It can be 3-split to give C27.4′.
It can be 5-split to give C53.4′.
It can be 7-split to give C79.4′.

It is the result of rectifying {4,4}_(3,2).

Other Regular Maps