Torsion-Free Lattices in Baumslag-Solitar Complexes
Abstract
This paper classifies the pairs of nonzero integers (m,n) for which the locally compact group of combinatorial automorphisms, Aut(Xm,n), contains incommensurable torsion-free lattices, where Xm,n is the combinatorial model for Baumslag-Solitar group BS(m,n). In particular, we show that Aut(Xm,n) contains abstractly incommensurable torsion-free lattices if and only if there exists a prime p ≤ gcd(m,n) such that either mgcd(m,n) or ngcd(m,n) is divisible by p. In all these cases, we construct infinitely many commensurability classes. Additionally, we show that when Aut(Xm,n) does not contain incommensurable lattices, the cell complex Xm,n satisfies Leighton's property.
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