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Communications in Algebra Volume 36, 2008 - Issue 6
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Original Articles

Rings with Zassenhaus Families of Ideals

Joshua Buckner Department of Mathematics, Baylor University, Waco, Texas, USA
&
Manfred Dugas Department of Mathematics, Baylor University, Waco, Texas, USACorrespondence[email protected]
Pages 2133-2142 | Received 29 Nov 2006, Published online: 12 Jun 2008

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  • Butler , M. C. R. ( 1968 ). On locally free torsion-free rings of finite rank . J. London Math. Soc. 43 ( 2 ): 202 – 216 .
  • Corner , A. L. S. ( 1963 ). Every countable reduced torsion-free ring is an endomorphism ring . Proc. London Math. Soc. 13 ( 3 ): 687 – 710 .
  • Dugas , M. , Göbel , R. An extension of Zassenhau' theorem on endomorphism rings. To appear in Fund. Math .
  • Hungerford , T. W. ( 1974 ). Algebra . Graduate Texts in Mathematics . New York : Springer .
  • Mader , A. , Vinsonhaler , C. ( 1988 ). Torsion-free E-modules . J. Algebra 115 : 401 – 411 .
  • Reid , J. D. , Vinsonhaler , C. ( 1995 ). A theorem of M. C. R. Butler for Dedekind domains . J. Algebra 175 : 878 – 989 .
  • Zassenhaus , H. ( 1967 ). Orders as endomorphism rings of modules of the same rank . J. London Math. Soc. 42 : 180 – 182 .
  • Communicated by K. M. Rangaswamy.

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