Nielsen equivalence in a class of random groups
Abstract
We show that for every n 2 there exists a torsion-free one-ended word-hyperbolic group G of rank n admitting generating n-tuples (a1,… ,an) and (b1,… ,bn) such that the (2n-1)-tuples (a1,… ,an, 1,… ,1n-1 times) and (b1,…, bn, 1,… ,1n-1 times) are not Nielsen-equivalent in G. The group G is produced via a probabilistic construction.
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