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Communications in Algebra Volume 33, 2005 - Issue 11
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Original Articles

Perfect Rings: A Local Approach

Gene Abrams Department of Mathematics, University of Colorado, Colorado Springs, Colorado, USACorrespondence[email protected]
&
Frank Anderson Department of Mathematics, University of Oregon, Eugene, Oregon, USA
Pages 4171-4175 | Received 21 Jun 2004, Published online: 01 Feb 2007

REFERENCES

  • Abrams , G. , Ánh , P. N. , Márki , L. ( 1992 ). A topological approach to Morita equivalence for rings with local units . Rocky Mountain J. Math. 22 ( 2 ): 405 – 416 . [CSA]
  • Anderson , F. , Fuller , K. ( 1992 ). Rings and Categories of Modules. , 2nd ed. Graduate Texts in Mathematics . Vol. 13 . New York : Springer Verlag .
  • Ánh , P. N. , Márki , L. ( 1987 ). Morita equivalence for rings without identity . Tsukuba J. Math. 11 : 1 – 16 . [CSA]
  • Ánh , P. N. , Loi , N. V. , Thanh , D. V. ( 1991 ). Perfect rings without identity . Comm. Alg. 19 ( 4 ): 1069 – 1082 . [CSA]
  • Bass , H. ( 1960 ). Finitistic dimension and a homological generalization of semi-primary rings . Trans. Am. Math. Soc. 95 : 466 – 488 . [CSA]
  • Beattie , M. ( 1988 ). A generalization of the smash product of a graded ring . J. Pure App. Alg. 52 : 219 – 226 . [CSA] [CROSSREF]
  • Beattie , M. , Jespers , E. ( 1991 ). On perfect graded rings . Comm. Alg. 19 ( 8 ): 2363 – 2371 . [CSA]
  • Năstăsescu , C. , Dăus , L. , Torrecillas , B. ( 2003 ). Graded semiartinian rings: Graded perfect rings . Comm. Alg. 31 ( 9 ): 4525 – 4531 . [CSA] [CROSSREF]
  • Communicated by K. M. Rangaswamy.

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