On Gerko's Strongly Tor-independent Modules

Sean K. Sather-Wagstaff

On Gerko's Strongly Tor-independent Modules

Abstract

Gerko proves that if an artinian local ring (R,mR) possesses a sequence of strongly Tor-independent modules of length n, then mRn≠ 0. This generalizes readily to Cohen-Macaulay rings. We present a version of this result for non-Cohen-Macaulay rings.

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