On arithmetic properties of solvable Baumslag-Solitar groups

Abstract

For 0<α 1, we say that a sequence (Xk)k>0 of d-regular graphs has property Dα if there exists a constant C>0 such that diam(Xk) C·|Xk|α. We investigate property Dα for arithmetic box spaces of the solvable Baumslag-Solitar groups BS(1,m) (with m≥ 2): those are box spaces obtained by embedding BS(1,m) into the upper triangular matrices in GL2(Z[1/m]) and intersecting with a family MNk of congruence subgroups of GL2(Z[1/m]), where the levels Nk are coprime with m and Nk|Nk+1. We prove: - if an arithmetic box space has Dα, then α12~; - if the family (Nk)k of levels is supported on finitely many primes, the corresponding arithmetic box space has D1/2~; - if the family (Nk)k of levels is supported on a family of primes with positive analytic primitive density, then the corresponding arithmetic box space does not have Dα, for every α>0. Moreover, we prove that if we embed BS(1,m) in the group of invertible upper-triangular matrices Tn(Z[1/m]), then every finite index subgroup of the embedding contains a congruence subgroup. This is a version of the congruence subgroup property (CSP).

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