On a variant of the Beckmann–Black problem

Legrand, François

doi:10.1090/proc/15909

On a variant of the Beckmann–Black problem
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Proc. Amer. Math. Soc. 150 (2022), 3267-3281 Request permission

Abstract:

Given a field $k$ and a finite group $G$, the Beckmann–Black problem asks whether every Galois field extension $F/k$ with group $G$ is the specialization at some $t_0 \in k$ of some Galois field extension $E/k(T)$ with group $G$ and $E \cap \overline {k} = k$. We show that the answer is positive for arbitrary $k$ and $G$, if one waives the requirement that $E/k(T)$ is normal. In fact, our result holds if $\operatorname {Gal}(F/k)$ is any given subgroup $H$ of $G$ and, in the special case $H=G$, we provide a similar conclusion even if $F/k$ is not normal. We next derive that, given a division ring $H$ and an automorphism $\sigma$ of $H$ of finite order, all finite groups occur as automorphism groups over the skew field of fractions $H(T, \sigma )$ of the twisted polynomial ring $H[T, \sigma ]$.

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