The growth of residually soluble groups
Abstract
Building on work of Wilson, we show that if G is a finitely generated residually soluble group whose growth function γ satisfies ( γ(n))/ n1/4 0 as n ∞ then G is virtually nilpotent. This shows that Grigorchuk's Gap Conjecture holds for all exponents β < 1/4 within the class of residually soluble groups (improving Wilson's exponent 1/6). We also discuss stronger versions of the Gap Conjecture.
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