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Depth of an initial ideal

Published 30 Jul 2019 in math.AC | (1907.12710v2)

Abstract: Given an arbitrary integer $d>0$, we construct a homogeneous ideal $I$ of the polynomial ring $S = K[x_1, \ldots, x_{3d}]$ 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 $0 \leq r \leq d$, there exists a monomial order $<r$ on $S$ with ${\rm depth} (S/{\rm in}{<r}(I)) = r$, where ${\rm in}{<_r}(I)$ is the initial ideal of $I$ with respect to $<_r$.

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