Groups of arbitrary lawlessness growth

Abstract

For a finitely generated lawless group and n ∈ N, let A (n) be the minimal positive integer Mn such that for all nontrivial reduced words w of length at most n in the free group of fixed rank k ≥ 2, there exists g ∈ k of word-length at most Mn with w(g) ≠ e. For any unbounded nondecreasing function f : N → N satisfying some mild assumptions, we construct such that the function A is equivalent to f. Our result generalizes both a Theorem of the first named author, who constructed groups for which A is unbounded but grows more slowly than any prescribed function f, and a result of Petschick, who constructed lawless groups for which A grows faster than any tower of exponential functions.

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