中文

Open loci of graded modules

交换代数 2007-05-23 v1 环与代数

摘要

Let A=i\nnAiA=\oplus_{i\in \nn}A_i be an excellent homogeneous Noetherian graded ring and let M=n\zzMnM=\oplus_{n\in \zz}M_n be a finitely generated graded AA-module. We consider MM as a module over A0A_0 and show that the (Sk)(S_k)-loci of MM are open in \Spec(A0)\Spec(A_0). In particular, the Cohen-Macaulay locus UCM0={\p\Spec(A0)M\pisCohenMacaulay}U^0_{CM}=\{\p\in \Spec(A_0) \mid M_\p {is Cohen-Macaulay}\} is an open subset of \Spec(A0)\Spec(A_0). We also show that the (Sk)(S_k)-loci on the homogeneous parts MnM_n of MM are eventually stable. As an application we obtain that for a finitely generated Cohen-Macaulay module MM over an excellent ring AA and for an ideal IAI\subseteq A which is not contained in any minimal prime of MM the (Sk)(S_k)-loci for the modules M/InMM/I^nM are eventually stable.

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引用

@article{arxiv.math/0403399,
  title  = {Open loci of graded modules},
  author = {Christel Rotthaus and Liana M. Sega},
  journal= {arXiv preprint arXiv:math/0403399},
  year   = {2007}
}

备注

22 pages