Iterated Mapping Cones on the Koszul Complex and Their Application to Complete Intersection Rings

Abstract

Let (R, m, k) be a complete intersection local ring, K be the Koszul complex on a minimal set of generators of m, and A=H(K) be its homology algebra. We establish exact sequences involving direct sums of the components of A and express the images of the maps of these sequences as homologies of iterated mapping cones built on K. As an application of this iterated mapping cone construction, we recover a minimal free resolution of the residue field k over R, independent from the well-known resolution constructed by Tate by adjoining variables and killing cycles. Through our construction, the differential maps can be expressed explicitly as blocks of matrices, arranged in some combinatorial patterns.

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