The finite type of modules of bounded projective dimension and Serre's conditions

Abstract

Let R be a commutative noetherian ring. We prove that the class of modules of projective dimension bounded by k is of finite type if and only if R satisfies Serre's condition (Sk). In particular, this answers positively a question of Bazzoni and Herbera in the specific setting of a Gorenstein ring. Applying similar techniques, we also show that the k-dimensional version of the Govorov-Lazard Theorem holds if and only if R satisfies the "almost" Serre condition (Ck+1).

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