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On Condensed Noetherian Domains Whose Integral Closures are Discrete Valuation Rings

Published online by Cambridge University Press:  20 November 2018

Christian Gottlieb*
Affiliation:
Department of Mathematics, University of Stockholm, Box 6701, S-113 85 Stockholm, Sweden
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Abstract

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A condensed domain is an integral domain such that IJ = {xy : xI, yJ } holds for each pair I, J of ideals. We prove that, under suitable conditions, a subring of a discrete valuation ring is condensed if and only if it contains an element of value 2. We also define the concept strongly condensed.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1989

References

1. Anderson, David F. and Dobbs, David E., On the product of ideals, Canad. Math. Bull. Vol. 26 no 1 (1983).Google Scholar
2. Anderson, David F., Jimmy T. Arnold and David Dobbs, E., Integrally closed condensed domains are Bézout. Canad. Math. Bull. Vol 28 no 1 (1985).Google Scholar