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Article overview
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Profinite groups and centralizers of coprime automorphisms whose elements are Engel | Cristina Acciarri
; Danilo Sanção da Silveira
; | Date: |
20 Jul 2017 | Abstract: | Let $q$ be a prime, $n$ a positive integer and $A$ an elementary abelian
group of order $q^r$ with $rgeq2$ acting on a finite $q’$-group $G$. The
following results are proved.
We show that if all elements in $gamma_{r-1}(C_G(a))$ are $n$-Engel in $G$
for any $ain A^#$, then $gamma_{r-1}(G)$ is $k$-Engel for some
${n,q,r}$-bounded number $k$, and if, for some integer $d$ such that $2^dleq
r-1$, all elements in the $d$th derived group of $C_G(a)$ are $n$-Engel in $G$
for any $ain A^#$, then the $d$th derived group $G^{(d)}$ is $k$-Engel for
some ${n,q,r}$-bounded number $k$.
Assuming $rgeq 3$ we prove that if all elements in $gamma_{r-2}(C_G(a))$
are $n$-Engel in $C_G(a)$ for any $ain A^#$, then $gamma_{r-2}(G)$ is
$k$-Engel for some ${n,q,r}$-bounded number $k$, and if, for some integer $d$
such that $2^dleq r-2$, all elements in the $d$th derived group of $C_G(a)$
are $n$-Engel in $C_G(a)$ for any $ain A^#,$ then the $d$th derived group
$G^{(d)}$ is $k$-Engel for some ${n,q,r}$-bounded number $k$.
Analogue (non-quantitative) results for profinite groups are also obtained. | Source: | arXiv, 1707.6889 | Services: | Forum | Review | PDF | Favorites |
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