An analogue of a theorem due to Levin and Vasconcelos
Abstract
Let (R,) be a Noetherian local ring. Consider the notion of homological dimension of a module, denoted H-dim, for H= Reg, CI, CI*, G, G* or CM. We prove that, if for a finite R-module M of positive depth, R(iM) is finite for some i ≥ (M), then the ring R has property H.
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