Stabilizers in Higman-Thompson groups
Abstract
We investigate stabilizers of finite sets of rational points in Cantor space for the Higman-Thompson groups Vn,r. We prove that the pointwise stabilizer is an iterated ascending HNN extension of Vn,q for any q≥ 1. We also prove that the commutator subgroup of the pointwise stabilizer is simple, and we compute the abelianization. Finally, for each n we classify such pointwise stabilizers up to isomorphism.
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