Tilting and untilting for ideals in perfectoid rings

Abstract

For an (integral) perfectoid ring R of characteristic 0 with tilt R, we introduce and study a tilting map (-) from the set of p-adically closed ideals of R to the set of ideals of R and an untilting map (-) from the set of radical ideals of R to the set of ideals of R. The untilting map (-) is defined purely algebraically and generalizes the analytically defined untilting map on closed radical ideals of a perfectoid Tate ring of characteristic p introduced by the first author. We prove that these two maps, (-) and (-), define an inclusion-preserving bijection between the set of ideals J of R such that the quotient R/J is perfectoid and the set of p-adically closed radical ideals of R, where p∈ R corresponds to a compatible system of p-power roots of a unit multiple of p in R. Furthermore, we prove that the maps send (closed) prime ideals to prime ideals and thus define a homeomorphism between the subspace of the spectrum of R consisting of prime ideals p of R such that R/p is perfectoid and the subspace of the spectrum of R consisting of p-adically closed prime ideals of R. In particular, we obtain a generalization and a new proof of the main result of the first author's previous research which concerned prime ideals in perfectoid Tate rings.