Trace Minimization and Roots in PSL(2,R)

Abstract

Suppose that A,B ∈ PSL(2,R) generate a non-elementary Fuchsian group. Let m,n∈N+, and let R,S∈ PSL(2,R) such that Rm=A and Sn=B. We present explicit algorithms to check whether R,S is a Fuchsian group. These algorithms rely only on the knowledge of the traces tr(A), tr(B), and tr(AB), which we assume to be given as algebraic numbers. The main tools are the classic Trace Minimization Algorithm, as introduced in 1972 by the third author, a new Extended Trace Minimization Algorithm, and a Rational Angle Recovery Algorithm which checks whether a given number x is if the form x = 2 (p π/q). The question when roots of the generators of a free Fuchsian group of rank 2 generate again a free Fuchsian group of rank 2, and an extension to positive rational exponents m,n are treated, as well.