On Perfectoidizaiton of Finite Algebras over a Perfectoid Ring

Abstract

We study general properties of the perfectoidization of finite algebras over a perfectoid ring, which helps to understand some precise and explicit descriptions. For example, we prove that if A=R[t]/(m(t)) where m(t) is monic, R is perfectoid and the discriminant d of m(t) is a non-zero divisor of R satisfying a bounded torsion condition, then dApfd⊂ A. We also prove a density criterion reducing the construction of the perfectoidization to adjoining suitable p-power roots modulo p. In the second part of the paper, we compute perfectoidizations in several families of examples, including Kummer-type extensions and split finite algebras.