Finding generators and relations for groups acting on the hyperbolic ball

Abstract

In order to enumerate the fake projective planes, as announced in~CS, we found explicit generators and a presentation for each maximal arithmetic subgroup of~PU(2,1) for which the (appropriately normalized) covolume equals~1/N for some integer~N1. Prasad and Yeung PY1,PY2 had given a list of all such (up to equivalence). The generators were found by a computer search which uses the natural action of PU(2,1) on the unit ball B(2) in~2. Our main results here give criteria which ensure that the computer search has found sufficiently many elements of~ to generate , and describes a family of relations amongst the generating set sufficient to give a presentation of~. We give an example illustrating details of how this was done in the case of a particular~ (for which N=864). While there are no fake projective planes in this case, we exhibit a torsion-free subgroup~ of index~N in~, and give some properties of the surface~ B(2).