The mapping cone of an Eisenbud operator and applications to exact zero divisors
Abstract
Let (Q,m, k) be a local ring that admits an exact pair of zero divisors (f,g), M a Q-module with fM = 0 and U a free resolution of M over Q. We construct a degree -2 chain map, which we call an Einsenbud operator, on the complex U Q Q/(f,g) and use the mapping cone of the operator to study two exact sequences that relate homology over Q to homology over Q/(f). Several applications are given.
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