Commutators, commensurators, and PSL2(Z)
Abstract
Let H<PSL2(Z) be a finite index normal subgroup which is contained in a principal congruence subgroup, and let (H)≠ H denote a term of the lower central series or the derived series of H. In this paper, we prove that the commensurator of (H) in PSL2(R) is discrete. We thus obtain a natural family of thin subgroups of PSL2(R) whose commensurators are discrete, establishing some cases of a conjecture of Shalom.
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