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Communications in Algebra Volume 28, 2000 - Issue 2
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Original Articles

The lie n-engel property in group rings

Gregory T. Lee Department of Mathematical Sciences, University of Alberta, Edmonton, Alberta, T6G 2G1, Canada
Pages 867-881 | Received 01 Sep 1998, Published online: 27 Jun 2007

References

  • Giambruno , A. and Sehgal , S.K. 1993 . Lie nilpotence of group rings . Comm.Algebra , 21 : 4253 – 4261 .
  • Giambruno , A. , Sehgal , S.K. and Valenti , A. 1998 . Symmetric units and group identities . Manuscripta Math , 96 : 443 – 461 .
  • Hall , M. 1959 . The theory of groups , New York : Macmillan .
  • Herstein , I. 1976 . Rings with involution , Chicago : Univ. of Chicago Press .
  • Lee G.T. Group rings whose symmetric elements are Lie nilpotent Proc. Amer. Math. Soc to appear
  • Passi , I.B.S. , Passman , D.S. and Sehgal , S.K. 1973 . Lie solvable group rings . Canad. J. Math , 25 : 748 – 757 .
  • Passman , D.S. 1977 . The algebraic structure of group rings , New York : Wiley .
  • Passman , D.S. 1997 . Group algebras whose units satisfy a group identity II . Proc. Amer. Math. Soc , 125 : 657 – 662 .
  • Sehgal , S.K. 1978 . Topics in group rings , New York : Marcel Dekker .

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