A Quantitative Selberg's Lemma

Abstract

We show that an arithmetic lattice in a semi-simple Lie group G contains a torsion-free subgroup of index δ(v) where v = μ (G/) is the co-volume of the lattice. We prove that δ is polynomial in general and poly-logarithmic under GRH. We then show that this poly-logarithmic bound is almost optimal, by constructing certain lattices with torsion elements of order v v.

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