Test ideals in rings with finitely generated anti-canonical algebras

Abstract

Many results are known about test ideals and F-singularities for Q-Gorenstein rings. In this paper we generalize many of these results to the case when the symbolic Rees algebra OX OX(-KX) OX(-2KX) ... is finitely generated (or more generally, in the log setting for -KX - ). In particular, we show that the F-jumping numbers of τ(X, at) are discrete and rational. We show that test ideals τ(X) can be described by alterations as in Blickle-Schwede-Tucker (and hence show that splinters are strongly F-regular in this setting -- recovering a result of Singh). We demonstrate that multiplier ideals reduce to test ideals under reduction modulo p when the symbolic Rees algebra is finitely generated. We prove that Hartshorne-Speiser-Lyubeznik-Gabber type stabilization still holds. We also show that test ideals satisfy global generation properties in this setting.