Filter regular sequence under small perturbations
Abstract
We answer affirmatively a question of Srinivas--Trivedi: in a Noetherian local ring (R,m), if I=(f1,…,fr) is an ideal generated by a filter-regular sequence and J is an ideal such that I+J is m-primary, then there exists N>0 such that for any 1,…,r ∈ mN, we have an equality of Hilbert functions: H(J, R/(f1,…,fr))(n)=H(J, R/(f1+1,…, fr+r))(n) for all n≥ 0. We also prove that the dimension of the non Cohen--Macaulay locus does not increase under small perturbations.
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