Let $R$ be a discrete valuation ring with fraction field $K$. Let $X$ be a
flat $R$-scheme of finite type and $G$ a finite flat group scheme acting on $X$
so that $G\_K$ is faithful on the generic fibre $X\_K$. We prove that there is
an effective model of $G$ i.e. a finite flat group scheme dominated by $G$,
isomorphic to it on the generic fibre, and extending the action of $G\_K$ on
$X\_K$ to an action on all of $X$ that is faithful also on the special fibre.
It is unique with these properties. We give examples and applications to
degenerations of coverings of curves

Romagny, Matthieu

English

arXiv

Let $R$ be a discrete valuation ring with fraction field $K$. Let $X$ be a flat $R$-scheme of finite type and $G$ a finite flat group scheme acting on $X$ so that $G_K$ is faithful on the generic fibre $X_K$. We prove that there is an effective model of $G$ i.e. a finite flat group scheme dominated by $G$, isomorphic to it on the generic fibre, and extending the action of $G_K$ on $X_K$ to an action on all of $X$ that is faithful also on the special fibre. It is unique with these properties. We give examples and applications to degenerations of coverings of curves

Hal-Diderot

Effective model of a finite group action

http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.235.7285

Effective model of a finite group action

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Hal-Diderot