A quantitative Neumann lemma for finitely generated groups
Abstract
We study the coset covering function C(r) of a finitely generated group: the number of cosets of infinite index subgroups needed to cover the ball of radius r. We show that C(r) is of order at least r for all groups. Moreover, we show that C(r) is linear for a class of amenable groups including virtually nilpotent and polycyclic groups, and that it is exponential for property (T) groups.
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