On Growth of Generalized Grigorchuk's Overgroups

Abstract

Grigorchuk's Overgroup G, is a branch group of intermediate growth. It contains the first Grigorchuk's torsion group G of intermediate growth constructed in 1980, but also has elements of infinite order. It's growth is substantially greater than the growth of G. The group G, corresponding to the sequence (012)∞ = 012012 ..., is a member of the family \ Gω | ω ∈ = \ 0, 1, 2 \N \ consisting of groups of intermediate growth when sequence ω is not virtually constant. Following this construction we define the family \ Gω, ω ∈ \ of generalized overgroups. Then G = G(012)∞ and Gω is a subgroup of Gω for each ω ∈ . We prove, if ω is eventually constant, then Gω is of polynomial growth and if ω is not eventually constant, then Gω is of intermediate growth.