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http://dx.doi.org/10.4134/BKMS.b180907

CONSECUTIVE CANCELLATIONS IN FILTERED FREE RESOLUTIONS  

Sharifan, Leila (Hakim Sabzevari University)
Publication Information
Bulletin of the Korean Mathematical Society / v.56, no.4, 2019 , pp. 1077-1097 More about this Journal
Abstract
Let M be a finitely generated module over a regular local ring (R, n). We will fix an n-stable filtration for M and show that the minimal free resolution of M can be obtained from any filtered free resolution of M by zero and negative consecutive cancellations. This result is analogous to [10, Theorem 3.1] in the more general context of filtered free resolutions. Taking advantage of this generality, we will study resolutions obtained by the mapping cone technique and find a sufficient condition for the minimality of such resolutions. Next, we give another application in the graded setting. We show that for a monomial order ${\sigma}$, Betti numbers of I are obtained from those of $LT_{\sigma}(I)$ by so-called zero ${\sigma}$-consecutive cancellations. This provides a stronger version of the well-known cancellation "cancellation principle" between the resolution of a graded ideal and that of its leading term ideal, in terms of filtrations defined by monomial orders.
Keywords
minimal free resolution; filtered module; associated graded module; filtered free resolution; consecutive cancellation; mapping cone; leading term ideal; ${\sigma}-Gr{\ddot{o}}bner$ filtration;
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