On Stably Pointed Varieties and Generically Stable Groups in ACVF
Abstract
We give a geometric description of the pair (V,p), where V is an affine algebraic variety over a non-trivially valued algebraically closed field K with valuation ring OK and p is a Zariski dense generically stable type concentrated on V, by defining a fully faithful functor to the category of schemes over OK with residual dominant morphisms over OK. We also study a maximum modulus principle on schemes over OK and show that the schemes obtained by this functor enjoy it.
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