The growth of some orbifold groups (Q1307052)

Recall that a Lannér group is a group generated by the reflexions in the sides of a Coxeter simplex in the hyperbolic space \(\mathbb{H}^n\). One speaks of quasi-Lannér groups when the simplex is allowed to have vertices at infinity. The authors compute the growth series of those quasi-Lannér groups which correspond to simplices with all vertices at infinity (ideal simplices). After a discussion of relations between the growth series of certain groups and the growth series of associated tesselations, the authors describe two noncompact orientable hyperbolic 3-manifolds and give the growth series of their groups.