On the depth of tensor products over Cohen-Macaulay rings

Abstract

Inspired by classical work on the depth formula for tensor products of finitely generated R-modules, we introduce two conditions which we call (ldep) and (rdep) and their derived variations. We show for Cohen-Macaulay local rings that derived (ldep) is equivalent to (R) being a uniform Auslander bound for R, and if (R)>0 that both are equivalent to (ldep). We introduce an analogous condition we call the uniform Buchweitz condition and provide a corresponding theorem for the (rdep) condition. As a consequence of these results, we show (ldep) implies (rdep) when R is Gorenstein and that the (ldep) and (rdep) conditions behave well under modding out by regular sequences and completion, but we give a concrete example showing they need not localize. Using our methods, we extend work of Jorgensen by calculating the value qR(M,N):=\i TorRi(M,N) 0\ under certain conditions.