Extremal behavior of divisibility functions
Abstract
In this short article, we study the extremal behavior F(n) of divisibility functions D introduced by the first author for finitely generated groups . We show finitely generated subgroups of (m,K) for an infinite field K have at most polynomial growth for the function F(n). Consequently, we obtain a dichotomy for the growth rate of F(n) for finitely generated subgroups of (n,). We also show that if F(n) n, then is finite. In contrast, when contains an element of infinite order, n F(n). We end with a brief discussion of some geometric motivation for this work.
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