Descendability of Faithfully Flat Covers of Perfect Stacks

Abstract

In 1981, L. Gruson and C. U. Jensen gave a new proof of the fact that, over a ring which is either Noetherian of Krull dimension n or of cardinality < n, the projective dimension of any flat module is at most n. In this short paper, we observe that their arguments apply to the setting of quasicoherent sheaves over perfect stacks. As a consequence, we show that for any perfect stack X with a faithfully flat cover p : Spec(R) X, where R is a Noetherian E∞-ring of finite Krull dimension or satisfies the cardinality bound 2|π*(R)| < ω, p*(OSpec(R)) is a descendable algebra in QCoh(X).