English

The Hilbert Function of a Maximal Cohen-Macaulay Module

Commutative Algebra 2007-05-23 v2

Abstract

We study Hilbert functions of maximal Cohen-Macaulay(=CM) modules over CM local rings. We show that if AA is a hypersurface ring with dimension d>0d > 0 then the Hilbert function of MM \wrt \m\m is non-decreasing. If A=Q/(f)A = Q/(f) for some regular local ring QQ, we determine a lower bound for e0(M)e_0(M) and e1(M)e_1(M). We analyze the case when equality holds and prove that in this case G(M)G(M) is CM. Furthermore in this case we also determine the Hilbert function of MM. When AA is Gorenstein then MM is the first syzygy of SA(M)=(\Syz1A(M))S^A(M) = (\Syz^{A}_{1}(M^*))^*. A relation between the second Hilbert coefficient of MM, AA and SA(M)S^A(M) is found when G(M)G(M) is \CM and \depthG(A)d1\depth G(A) \geq d-1. We give bounds for the first Hilbert coefficients of the canonical module of a CM local ring and analyse when equality holds. We also give good bounds on Hilbert coefficients of MM when MM is maximal CM and G(M)G(M) is CM.

Keywords

Cite

@article{arxiv.math/0409051,
  title  = {The Hilbert Function of a Maximal Cohen-Macaulay Module},
  author = {Tony J. Puthenpurakal},
  journal= {arXiv preprint arXiv:math/0409051},
  year   = {2007}
}

Comments

referee's suggestions added, 20 pages, accepted for publication in Math Z