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Communications in Algebra Volume 38, 2010 - Issue 12
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Original Articles

Idempotent Units of Commutative Group Rings

Peter Danchev Department of Mathematics, Plovdiv State University, Plovdiv, BulgariaCorrespondence[email protected]
Pages 4649-4654 | Received 27 Mar 2009, Published online: 20 Jan 2011

REFERENCES

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  • Danchev , P. V. ( 2009 ). Trivial units in abelian group algebras . Extr. Math. 24 : 47 – 53 .
  • Danchev , P. V. ( 2009 ). Idempotent units in commutative group rings . Kochi J. Math. 4 : 61 – 68 .
  • Danchev , P. V. ( 2010 ). On some idempotent-torsion decompositions of normed units in commutative group rings . J. Calcutta Math. Soc. 6 : 31 – 34 .
  • Danchev , P. V. ( 2011 ). Idempotent-torsion normalized units in abelian group rings. Bull. Calcutta Math. Soc., to appear .
  • Fuchs , L. ( 1970 and 1973 ). Infinite Abelian Groups, I and II. New York and London : Acad. Press .
  • Karpilovsky , G. ( 1982 ). On units in commutative group rings . Arch. Math. (Basel) 38 : 420 – 422 .
  • Karpilovsky , G. ( 1983 ). On finite generation of unit groups of commutative group rings . Arch. Math. (Basel) 40 : 503 – 508 .
  • Karpilovsky , G. ( 1989 ). Unit Groups of Group Rings . Harlow : Longman Sci. and Techn .
  • Karpilovsky , G. ( 1990 ). Units of commutative group algebras . Expo. Math. 8 : 247 – 287 .
  • May , W. ( 1976 ). Group algebras over finitely generated rings . J. Algebra 39 : 483 – 511 .
  • Communicated by J. Alev.

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