Finite generation for the group $F\left(\frac32\right)$

Published 13 Sep 2024 in math.GR | (2409.09195v1)

Abstract: In this paper it is proved that the group $F\left(\frac32\right)$, a Thompson-style group with breaks in $\mathbb{Z}\left[\frac16\right]$ but whose slopes are restricted only to powers of $\frac32$, is finitely generated, with a generating set of two elements.

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Finite presentability of F(3/2)

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