Available in electronic format
Available in print format		 Proceedings of the American Mathematical Society
Proceedings of the American Mathematical Society
ISSN 1088-6826 (e) ISSN 0002-9939 (p)
Previous issue | Table of contents | Next issue
Articles in press | Recently posted articles | Most recent issue | All issues
Previous Article | Next Article
     

A property of weakly Krull domains

Author(s): D. D. Anderson; Muhammad Zafrullah
Journal: Proc. Amer. Math. Soc. 131 (2003), 3689-3692.
MSC (2000): Primary 13F05
Posted: April 30, 2003
Retrieve article in: PDF

Abstract | References | Similar articles | Additional information

Abstract: We show that a weakly Krull domain $D$ satisfies $(\ast )$: for every pair $ a,b\in D\backslash \{0\}$ there is an $n=n(a,b)\in \mathbb{N} $ such that $ (a,b^{n})$ is $t$-invertible. For $D$ Noetherian, $D$ satisfies $(\ast )$ if and only if every grade-one prime ideal of $D$ is of height one. We also show that a modification of $(\ast )$ can be used to characterize Noetherian domains that are one-dimensional.

References:

[AMZ]
D.D. Anderson, J.L. Mott and M. Zafrullah, Finite character representations for integral domains, Boll. Un. Mat. Ital. B (7) 6 (1992), 613-630. MR 93k:13001

[B]
V. Barucci, Mori domains, Non-Noetherian Commutative Ring Theory, Math. Appl., vol. 520, Kluwer Acad. Publ., Dordrecht, 2000, pp. 57-73. MR 2002h:13028

[CMZ]
D. Costa, J.L. Mott and M. Zafrullah, The construction $D+XD_{S}[X]$, J. Algebra 53 (1978), 423-439. MR 58:22046

[G]
R. Gilmer, Multiplicative Ideal Theory, Queen's Papers in Pure and Appl. Math., vol. 90, Queen's University, Kingston, ON, 1992, corrected reprint of the 1972 edition, Pure Appl. Math., vol. 12, Marcel Dekker, New York. MR 93j:13001

[HH]
J.R. Hedstrom and E.G. Houston, Some remarks on star-operations, J. Pure Appl. Algebra 18 (1980), 37-44. MR 81m:13008

[K]
I. Kaplansky, Commutative Rings, University of Chicago Press, Chicago, IL, 1974, revised edition of the 1970 edition, Allyn and Bacon, Boston. MR 49:10674

[MMZ]
S. Malik, J.L. Mott and M. Zafrullah, On $t$-invertibility, Comm. Algebra 16 (1988), 149-170. MR 88j:13022

[O]
J. Ohm, Some counterexamples related to integral closure in $D[[x]]$, Trans. Amer. Math. Soc. 122 (1966), 321-333. MR 34:2613

[P]
M. Picavet-L'Hermitte, Factorization in some orders with a PID as integral closure, Algebraic Number Theory and Diophantine Analysis (Graz, 1998), de Gruyter, Berlin, 2000, pp. 365-390. MR 2001h:13001

[R]
P. Ribenboim, Anneaux normaux réels à caractère fini, Summa Brasil. Math. 3 (1956), 213-253. MR 20:3860

[Z]
M. Zafrullah, Putting $t$-invertibility to use, Non-Noetherian Commutative Ring Theory, Math. Appl., vol. 520, Kluwer Acad. Publ., Dordrecht, 2000, pp. 429-457. MR 2002g:13009

Similar Articles:

Retrieve articles in Proceedings of the American Mathematical Society with MSC (2000): 13F05

Retrieve articles in all Journals with MSC (2000): 13F05

Additional Information:

D. D. Anderson
Affiliation: Department of Mathematics, University of Iowa, Iowa City, Iowa 52242
Email: dan-anderson@uiowa.edu

Muhammad Zafrullah
Affiliation: Department of Mathematics, Idaho State University, Pocatello, Idaho 83209-8085
Email: mzafrullah@usa.net

DOI: 10.1090/S0002-9939-03-07047-3
PII: S 0002-9939(03)07047-3
Keywords: Weakly Krull
Received by editor(s): August 12, 2002
Posted: April 30, 2003
Communicated by: Bernd Ulrich
Copyright of article: Copyright 2003, American Mathematical Society

  AMS Website Logo Small Comments: webmaster@ams.org
© Copyright 2009, American Mathematical Society
Privacy Statement 		Search the AMSPowered by Google