Altered Local Uniformization Of Rigid-Analytic Spaces

Abstract

We prove a version of Temkin's local altered uniformization theorem. We show that for any rig-smooth, quasi-compact and quasi-separated admissible formal OK-model X, there is a finite extension K'/K such that XOK' locally admits a rig-\'etale morphism g X' XOK' and a rig-isomorphism h X" X' with X' being a successive semi-stable curve fibration over OK' and X" being a poly-stable formal OK'-scheme. Moreover, X' admits an action of a finite group G such that g X' XOK' is G-invariant, and the adic generic fiber X'K' becomes a G-torsor over its quasi-compact open image U=gK'(X'K'). Also, we study properties of the quotient map X'/G XOK' and show that it can be obtained as a composition of open immersions and rig-isomorphisms.