Automorphisms of finite order of nilpotent groups IV

Wehrfritz, B.A.F.

doi:10.4171/RSMUP/136-6

Wehrfritz, B.A.F.¹

¹Queen Mary University of London, LONDON, UNITED KINGDOM

Rendiconti del Seminario Matematico della Università di Padova, Tome 136 (2016), pp. 61-68

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Résumé

Let $ϕ$ be an automorphism of finite order of the nilpotent group $G$ of class $c$ and $m$ and $r$ positive integers with $ϕ^{m} = 1$ . Consider the two (not usually homomorphic) maps $ψ$ and $γ$ of $G$ given by

ψ : g ⟼ g \cdot g ϕ \cdot g ϕ^{2} \cdot ... \cdot g ϕ^{m - 1} and γ : g \mapsto g^{- 1} \cdot g ϕ for g \in G .

We prove that the subgroups

X = 〈 x α : x \in ker ψ, α \in Aut G, x^{r} \in ⋃_{s \geq 0} {(G γ)}^{s} 〉,

Y = 〈 g γ α : g \in G, α \in Aut G, {(g γ)}^{r} \in \ker γ 〉,

X^{*} = 〈 x^{r} α : x \in \ker ψ, \in α \in Aut G, x^{r} \in ⋃_{s \geq 0} {(G ψ)}^{s} 〉,

Y^{*} = 〈 {(g γ)}^{r} α : g \in G, α \in Aut G, {(g γ)}^{r} \in \ker γ 〉 = 〈 ({(G γ)}^{r} \cap \ker γ) Aut G 〉

of

G

all have finite exponent bounded in terms of

c

,

m

and

r

only. This yields alternative proofs of the theorem of [4] and its related bounds.

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DOI : 10.4171/RSMUP/136-6

Classification : 20
Mots-clés : Nilpotent group, automorphism of finite order

Affiliations des auteurs :

Wehrfritz, B.A.F. ¹

¹ Queen Mary University of London, LONDON, UNITED KINGDOM

Wehrfritz, B.A.F. Automorphisms of finite order of nilpotent groups IV. Rendiconti del Seminario Matematico della Università di Padova, Tome 136 (2016), pp. 61-68. doi: 10.4171/RSMUP/136-6

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     pages = {61--68},
     year = {2016},
     publisher = {European Mathematical Society Publishing House},
     address = {Zuerich, Switzerland},
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