Depth of an initial ideal
Abstract
Given an arbitrary integer d>0, we construct a homogeneous ideal I of the polynomial ring S = K[x1, …, x3d] in 3d variables over a filed K for which S/I is a Cohen--Macaulay ring of dimension d with the property that, for each of the integers 0 ≤ r ≤ d, there exists a monomial order <r on S with depth (S/ in<r(I)) = r, where in<r(I) is the initial ideal of I with respect to <r.
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