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dc.contributor.author이혜숙-
dc.contributor.author노선숙-
dc.date.accessioned2016-08-28T12:08:24Z-
dc.date.available2016-08-28T12:08:24Z-
dc.date.issued2009-
dc.identifier.issn0092-7872-
dc.identifier.otherOAK-5952-
dc.identifier.urihttps://dspace.ewha.ac.kr/handle/2015.oak/220279-
dc.description.abstractContractedness of m-primary integrally closed ideals played a central role in the development of Zariski's theory of integrally closed ideals in two-dimensional regular local rings (R, m). In such rings, the contracted m-primary ideals are known to be characterized by the property that I: m = I: x for some x ∈ m\m2. We call the ideals with this property full ideals and compare this class of ideals with the classes of m-full ideals, basically full ideals, and contracted ideals in higher dimensional regular local rings. The m-full ideals are easily seen to be full. In this article, we find a sufficient condition for a full ideal to be m-full. We also show the equivalence of the properties full, m-full, contracted, integrally closed, and normal, for the class of parameter ideals. We then find a sufficient condition for a basically full parameter ideal to be full. © Taylor & Francis Group, LLC.-
dc.languageEnglish-
dc.titleFull ideals-
dc.typeArticle-
dc.relation.issue8-
dc.relation.volume37-
dc.relation.indexSCIE-
dc.relation.indexSCOPUS-
dc.relation.startpage2627-
dc.relation.lastpage2639-
dc.relation.journaltitleCommunications in Algebra-
dc.identifier.doi10.1080/00927870902747340-
dc.identifier.wosidWOS:000270583700008-
dc.identifier.scopusid2-s2.0-70449490261-
dc.author.googleHong J.-
dc.author.googleLee H.-
dc.author.googleNoh S.-
dc.author.googleRush D.E.-
dc.contributor.scopusid이혜숙(56101914000;8368898800)-
dc.contributor.scopusid노선숙(8094035900)-
dc.date.modifydate20170601140331-
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자연과학대학 > 수학전공 > Journal papers
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