Growth behaviors in the range erα
Abstract
For every α ≤ β in a left neighborhood [α0,1] of 1, a group G(α,β) is constructed, the growth function of which satisfies bG(α,β)(r) r=α and bG(α,β)(r) r=β. When α=β, this provides an explicit uncountable collection of groups with growth functions strictly comparable. On the other hand, oscillation in the case α < β explains the existence of groups with non comparable growth functions. Some period exponents associated to the frequency of oscillation provide new group invariants.
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