Freeness and S-arithmeticity of rational M\"obius groups
Abstract
We initiate a new, computational approach to a classical problem: certifying non-freeness of (2-generator, parabolic) M\"obius subgroups of SL(2,Q). The main tools used are algorithms for Zariski dense groups and algorithms to compute a presentation of SL(2, R) for a localization R= Z[1b] of Z. We prove that a M\"obius subgroup G is not free by showing that it has finite index in the relevant SL(2, R). Further information about the structure of G is obtained; for example, we compute the minimal subgroup of finite index in SL(2,R) that contains G.
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