Test ideals in mixed characteristic: a unified theory up to perturbation

Abstract

Let X be an integral scheme of finite type over a complete DVR of mixed characteristic. We provide a definition of a test ideal which agrees with the multiplier ideal after inverting p, is computed from a sufficiently large alteration, agrees with previous mixed characteristic BCM test ideals after completing at any point of residue characteristic p (up to small perturbation), and which satisfies the full suite of expected properties of a multiplier or test ideal. This object is obtained via the p-adic Riemann-Hilbert functor.