Jørgensen groups of parabolic type. III: Uncountably infinite case. (Q2574389)

A non-elementary discrete two-generator subgroup \(G\) of PSL\((2, \mathbb{C})\) is called a Jørgensen group if there exist two generators \(A,B\) of \(G\) such that equality holds in Jørgensen's inequality. For such a group it is known that \(A\) is elliptic of order at least seven or \(A\) is parabolic. The authors pose the problem of finding all Jørgensen groups such that \(A\) is parabolic. Such a group is called of parabolic type. Since the problem of finding all Jørgensen groups of parabolic type seems to be a very delicate one, the authors introduce certain real parameters \(\theta,k\) and single out a subclass of groups of parabolic type \((\theta, k)\), and they pose the problem of finding all Jørgensen groups of parabolic type \((\theta,k)\). This problem is completely solved in three papers of which the present is the third and final one. The main result cannot be given here since the main theorem covers almost one printed page.