English

Star-Operations Induced by Overrings

Commutative Algebra 2007-05-23 v1

Abstract

Let DD be an integral domain with quotient field KK. A star-operation \star on DD is a closure operation AAA \longmapsto A^\star on the set of nonzero fractional ideals, F(D)F(D), of DD satisfying the properties: (xD)=xD(xD)^\star = xD and (xA)=xA(xA)^\star = xA^\star for all xKx \in K^\ast and AF(D)A \in F(D). Let \MS{\M S} be a multiplicatively closed set of ideals of DD. For AF(D)A \in F(D) define A\MS={xKxIAA_{\M S} = \{x \in K \mid xI \subseteq{A}, for some I\MS}I \in {\M S}\}. Then D\MSD_{\M S} is an overring of DD and A\MSA_{\M S} is a fractional ideal of D\MSD_{\M S}. Let \MS{\M S} be a multiplicative set of finitely generated nonzero ideals of DD and AF(D)A \in F(D), then the map AA\MSA \longmapsto A_{\M S} is a finite character star-operation if and only if for each I\MSI \in {\M S}, Iv=DI_v = D. We give an example to show that this result is not true if the ideals are not assumed to be finitely generated. In general, the map AA\MSA \longmapsto A_{\M S} is a star-operation if and only if \MSˉ\bar {\M S}, the saturation of \MS{\M S}, is a localizing GV-system. We also discuss star-operations given of the form AADαA \longmapsto \cap AD_\alpha, where D=DαD = \cap D_\alpha.

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Cite

@article{arxiv.math/0301046,
  title  = {Star-Operations Induced by Overrings},
  author = {Sharon M. Clarke},
  journal= {arXiv preprint arXiv:math/0301046},
  year   = {2007}
}

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This article consists of 11 pages