Topological spectrum and perfectoid Tate rings

Abstract

We study the topological spectrum of a seminormed ring R which we define as the space of prime ideals p such that p equals the kernel of some bounded power-multiplicative seminorm. For any seminormed ring R we show that the topological spectrum is a quasi-compact sober topological space. When R is a perfectoid Tate ring we construct a natural homeomorphism between the topological spectrum of R and the topological spectrum of its tilt R. As an application, we prove that a perfectoid Tate ring R is an integral domain if and only if its tilt is an integral domain.