A Subgroup Theorem for Homological Filling Functions
Abstract
We use algebraic techniques to study homological filling functions of groups and their subgroups. If G is a group admitting a finite (n+1)--dimensional K(G,1) and H ≤ G is of type Fn+1, then the nth--homological filling function of H is bounded above by that of G. This contrast with known examples where such inequality does not hold under weaker conditions on the ambient group G or the subgroup H. We include applications to hyperbolic groups and homotopical filling functions.
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