Homological torsion growth in non-normal chains of graphs of free groups
Abstract
Let G be a hyperbolic group that splits as a graph of free groups with cyclic edge groups, and which is not isomorphic to a free product of free and surface groups. We show that G admits an exhausting, nested sequence of finite-index non-normal subgroups G G1 G2 ·s with exponential homological torsion growth. More specifically, we prove that simultaneously for every prime p, n→ ∞ Torp(Gnab)[G:Gn] >0 (where Torp(Gnab) = \g ∈ Gnab \;\; g has order a power of p\).
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