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Analytically unramified ring

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In algebra, an analytically unramified ring is a local ring whose completion is reduced (has no nonzero nilpotent.)

The following rings are analytically unramified:

There are two classical theorems of David Rees that characterize analytically unramified rings. The first says that a noetherian local ring (R, m) is analytically unramified if and only if there are a m-primary ideal J and a sequence such that . The second says that a noetherian local domain is analytically unramified if and only if, for every finitely-generated R-algebra S lying between R and the field of fractions K of R, the integral closure of S in K is a finitely generated module over S.

References

  • Huneke, Craig; Swanson, Irena (2006), Integral closure of ideals, rings, and modules, London Mathematical Society Lecture Note Series, vol. 336, Cambridge, UK: Cambridge University Press, ISBN 978-0-521-68860-4, MR 2266432