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On representations of direct products and the bounded generation property of branch groups

We prove that the minimal representation dimension of a direct product $G$ of non-abelian groups $G_1,\ldots,G_n$ is bounded below by $n+1$ and thereby answer a question of Abért. If each $G_i$ is moreover non-solvable, then this lower bound can be improved to be $2n$. By combining this with results of Pyber, Segal, and Shusterman on the structure of boundedly generated groups we show that branch groups cannot be boundedly generated.

preprint2023arXivOpen access
Steffen KionkeEduard Schesler
math.GR
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Steffen KionkeEduard Schesler

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