Asymptotic vanishing conditions which force regularity in local rings of prime characteristic

Abstract

Let (R,,k) be a local (Noetherian) ring of positive prime characteristic p and dimension d. Let G be a minimal resolution of the residue field k, and for each i 0, let ti(R) = e \8 (Hi(Fe(G)))/ped. We show that if ti(R) = 0 for some i>0, then R is a regular local ring. Using the same method, we are also able to show that if R is an excellent local domain and iR(k,R+) = 0 for some i>0, then R is regular (where R+ is the absolute integral closure of R). Both of the two results were previously known only for i = 1 or 2 via completely different methods.