Affiliation:
1. Departamento de Matemáticas, Facultad de Ciencias, Universidad Nacional Autónoma de México (UNAM), 04510 Mexico, DF, Mexico
Abstract
Given a fundamental polyhedron for the action of , a classical
kleinian group, acting in -dimensional hyperbolic space, and , a finite index
subgroup of , one obtains a fundamental domain for pasting copies of
by a Schreier process. It also generalizes the side pairing
generating theorem for exact or inexact polyhedra. It is proved
as well that the general Möbius group acting in
is transitive on “-spheres”. Hence, describing the hyperbolic -planes in the upper half space
model intrinsically, and providing also an alternative proof of the transitive
action on them. Some examples are given in
detail, derived from the classical modular group and the Picard group.