Finite Birational extension with stable conductor
Abstract
Let S be a module finite birational extension of a 1-dimensional local Cohen--Macaulay ring R. When is the conductor of S in R a stable ideal? If R is also generically Gorenstein, then we show that the conductor of S in R is a stable ideal, and S is a reflexive R-module if and only if CM(S)=CM(S) CM(R).
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