Year 2008,
Volume: 3 Issue: 3, 117 - 124, 01.06.2008
Abstract
A ring is called left p.p. if the left annihilator of each element of R is generated by an idempotent. We prove that for a ring R and a group G, if the group ring RG is left p.p. then so is RH for every subgroup H of G; if in addition G is finite then |G|−1 ∈ R. Counterexamples are given to answer the question whether the group ring RG is left p.p. if R is left p.p. and G is a finite group with |G|−1 ∈ R. Let G be a group acting on R as automorphisms. Some sufficient conditions are given for the fixed ring RG to be left p.p.
Keywords
References
- M. Auslander, On regular group rings, Proc. Amer. Math. Soc. 8(1957), 658–
- S. U. Chase, A generalization of the ring of triangular matrices, Nagoya Math. J. 18 (1961) 13–25.
- A. W. Chatters and W. M. Xue, On right duo p.p. rings, Glasgow Math. J. 32 (1990) 221–225.
- J. L. Chen, Y. L. Li and Y. Q. Zhou, Morphic group rings, J. Pure Appl. Alg., (2006), 621–639.
- S. Endo, Note on p.p. rings, Nagoya Math. J. 17 (1960) 167–170.
- K. R. Goodearl, Von Neumann Regular Rings, Pitman, London, 1979.
- C. Y. Hong, N. K. Kim, and T. K. Kwak, Ore extensions of Baer and p.p. rings, J. Pure Appl. Alg., 151 (2000) 215–226.
- C. Huh, H. K. Kim, and Y. Lee, p.p. rings and generalized p.p. rings, J. Pure Appl. Alg., 167 (2002) 37–52.
- I. Kaplansky, Rings of Operators, Benjamin, New York, (1965).
- C. P. Milies and S. K. Sehgal, An Introduction to Group Rings,Kluwer Aca- demic Publishers, Dordrecht, (2002).
- L. W. Small, Semihereditary rings, Bull. Amer. Math. Soc. 73 (1967) 656–658.
- Z. Yi, Homological dimension of skew group rings and crossed products, J. Algebra, 164 (1994), 101–123.
- Z. Yi and Y. Q. Zhou, Baer and quasi-Baer properties of group rings, J. Aus- tral. Math. Soc., in press. Libo Zan College of Math & Physics Nanjing University of Information Science & Technology, Nanjing, China E-mail: zanlibo@yahoo.com.cn Jianlong Chen Department of Mathematics Southeast University, Nanjing, China E-mail: jlchen@seu.edu.cn
Year 2008,
Volume: 3 Issue: 3, 117 - 124, 01.06.2008
Abstract
References
- M. Auslander, On regular group rings, Proc. Amer. Math. Soc. 8(1957), 658–
- S. U. Chase, A generalization of the ring of triangular matrices, Nagoya Math. J. 18 (1961) 13–25.
- A. W. Chatters and W. M. Xue, On right duo p.p. rings, Glasgow Math. J. 32 (1990) 221–225.
- J. L. Chen, Y. L. Li and Y. Q. Zhou, Morphic group rings, J. Pure Appl. Alg., (2006), 621–639.
- S. Endo, Note on p.p. rings, Nagoya Math. J. 17 (1960) 167–170.
- K. R. Goodearl, Von Neumann Regular Rings, Pitman, London, 1979.
- C. Y. Hong, N. K. Kim, and T. K. Kwak, Ore extensions of Baer and p.p. rings, J. Pure Appl. Alg., 151 (2000) 215–226.
- C. Huh, H. K. Kim, and Y. Lee, p.p. rings and generalized p.p. rings, J. Pure Appl. Alg., 167 (2002) 37–52.
- I. Kaplansky, Rings of Operators, Benjamin, New York, (1965).
- C. P. Milies and S. K. Sehgal, An Introduction to Group Rings,Kluwer Aca- demic Publishers, Dordrecht, (2002).
- L. W. Small, Semihereditary rings, Bull. Amer. Math. Soc. 73 (1967) 656–658.
- Z. Yi, Homological dimension of skew group rings and crossed products, J. Algebra, 164 (1994), 101–123.
- Z. Yi and Y. Q. Zhou, Baer and quasi-Baer properties of group rings, J. Aus- tral. Math. Soc., in press. Libo Zan College of Math & Physics Nanjing University of Information Science & Technology, Nanjing, China E-mail: zanlibo@yahoo.com.cn Jianlong Chen Department of Mathematics Southeast University, Nanjing, China E-mail: jlchen@seu.edu.cn
There are 13 citations in total.
Details
| Other ID | JA66ER27JG |
|---|---|
| Journal Section | Articles |
| Authors | |
| Publication Date | June 1, 2008 |
| Published in Issue | Year 2008 Volume: 3 Issue: 3 |