Discrete two-generator subgroups of PSL2 over non-archimedean local fields

Abstract

Let K be a non-archimedean local field with residue field of characteristic p. We give necessary and sufficient conditions for a two-generator subgroup G of PSL2(K) to be discrete, where either K=Qp or G contains no elements of order p. We give a practical algorithm to decide whether such a subgroup G is discrete. We also give practical algorithms to decide whether a two-generator subgroup of either SL2(R) or SL2(K) (where K is a finite extension of Qp) is dense. A crucial ingredient for this work is a structure theorem for two-generator groups acting by isometries on a -tree.