English

Graded rings associated with contracted ideals

Commutative Algebra 2007-05-23 v2

Abstract

By definition, an \m\m-primary ideal II in a 2-dimensional regular local ring (R,\m)(R, \m) is contracted if I=RIR[\m/x]I=R \cap IR[\m/x] for some x\m\m2x \in \m \setminus \m^2. Contracted ideals have been introduced by Zariski and used for proving the unique factorization theorem for complete (i.e. integrally closed) ideals. Any complete ideal is contracted but not the other way round. While the associated graded rings to complete ideals are always Cohen-Macaulay, this is not the case for contracted ideals. Our goal is to study depth, Hilbert function and defining equations of the graded rings of homogeneous contracted ideals. We show, by using quadratic transform, that the depth of the associated graded ring to a contracted ideal II is determined by depth of the associated graded rings to a certain family of monomial ideals (indeed lex-segments) which are naturally attached to II. For certain classes of contracted ideals we show that the associated graded ring is Cohen-Macaulay or at least has positive depth.

Keywords

Cite

@article{arxiv.math/0403019,
  title  = {Graded rings associated with contracted ideals},
  author = {Aldo Conca and Emanuela De Negri and A. V. Jayanthan and Maria Evelina Rossi},
  journal= {arXiv preprint arXiv:math/0403019},
  year   = {2007}
}

Comments

A few misprints have been corrected