Fields of Fractions in Rigid Geometry

Abstract

Let A be an affinoid integral domain over a non-Archimedean field K, and let L be its field of fractions. We prove that the normalization of A can be reconstructed from L by taking the intersection of all maximal discrete valuation subrings. As a corollary, taking the field of fractions induces a fully faithful functor from the category of normal affinoid integral domains over K to the category of field extensions of K. This provides another p-adic analogue of the Riemann Hebbarkeitssatz.

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