Verbal subgroups of hyperbolic groups have infinite width
Abstract
Let G be a non-elementary hyperbolic group. Let w be a group word such that the set w[G] of all its values in G does not coincide with G or 1. We show that the width of verbal subgroup w(G)=<w[G]> is infinite. That is, there is no such l∈ Z that any g∈ w(G) can be represented as a product of l values of w and their inverses.
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