A finitary version of Gromov's polynomial growth theorem
Abstract
We show that for some absolute (explicit) constant C, the following holds for every finitely generated group G, and all d >0: If there is some R0 > ((CdC)) for which the number of elements in a ball of radius R0 in a Cayley graph of G is bounded by R0d, then G has a finite index subgroup which is nilpotent (of step <Cd). An effective bound on the finite index is provided if "nilpotent" is replaced by 'polycyclic", thus yielding a non-trivial result for finite groups as well.
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