Test ideals via algebras of $p^{-e}$-linear maps

Building on previous work of Schwede, Böckle, and the author, we study test ideals by viewing them as minimal objects in a certain class of modules, called $F$-pure modules, over algebras of $p^{-e}$-linear operators. We develop the basics of a theory of $F$-pure modules and show an important structural result, namely that $F$-pure modules have finite length. This result is then linked to the existence of test ideals and leads to a simplified and generalized treatment, also allowing us to define test ideals in non-reduced settings.

Combining our approach with an observation of Anderson on the contracting property of $p^{-e}$-linear operators yields an elementary approach to test ideals in the case of affine $k$-algebras, where $k$ is an $F$-finite field. As a byproduct, one obtains a short and completely elementary proof of the discreteness of the jumping numbers of test ideals in a generality that extends most cases known so far; in particular, one obtains results beyond the $\mathbb {Q}$-Gorenstein case.