Detecting finite flat dimension of modules via iterates of the Frobenius endomorphism

Abstract

It is proved that a module M over a Noetherian ring R of positive characteristic p has finite flat dimension if there exists an integer t 0 such that ToriR(M, fe\!R)=0 for t i t+ R and infinitely many e. This extends a result of Herzog, who proved it when M is finitely generated, and strengthens a result of the third author and Webb in the case M is arbitrary. It is also proved that when R is a Cohen-Macaulay local ring, it suffices that the Tor vanishing holds for one e pe(R), where e(R) is the multiplicity of R.