On generalized Hilbert-Kunz function and multiplicity

Abstract

Let (R, m) be a local ring of characteristic p>0 and M a finitely generated R-module. In this note we consider the limit: n ∞ (H0 m(Fn(M)))pn R where F(-) is the Peskine-Szpiro functor. A consequence of our main results shows that the limit always exists when R is excellent and has isolated singularity. Furthermore, if R is a complete intersection, then the limit is 0 if and only if the projective dimension of M is less than the Krull dimension of R. We exploit this fact to give a quick proof that if R is a complete intersection of dimension 3, then the Picard group of the punctured spectrum of R is torsion-free. Our results work quite generally for other homological functors and can be used to prove that certain limits recently studied by Brenner exist over projective varieties.