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One sided invertibility and localisation II

Published online by Cambridge University Press:  18 May 2009

C. R. Hajarnavis
Affiliation:
Mathematics Institute, University of Warwick, Coventry CV4 7AL
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The aim of this paper is to generalise the results of [7] from the prime to the semiprime case. It was shown, for instance, that if M is the annihilator of a simple right module S of projective dimension 1 over a Noetherian prime polynomial identity (PI) ring R then M is either an invertible ideal or an idempotent ideal [7, Proposition 4.2]. One of the main applications of this result was that a prime Noetherian affine PI ring of global dimension less than or equal to 2 is a finite module over its centre. It turns out that this theorem is valid more generally when the ring is semiprime [1, Theorem A]. Clearly this requires [7, Proposition 4.2] also to be strengthened to the semiprime case. We do this by showing that a right invertible maximal ideal in a semiprime Noetherian PI ring is also left invertible (Theorem 3.5).

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 1995

References

REFERENCES

1.Braun, A. and Hajarnavis, C. R., Finitely generated PI rings of global dimension 2, to appear in J. Algebra.Google Scholar
2.Braun, A. and Warfield, R. B. Jr, Symmetry and localisation in Noetherian prime PI rings, J. Algebra 118 (1988), 322334.Google Scholar
3.Chatters, A. W. and Hajarnavis, C. R., Rings with chain conditions, Research Notes in Mathematics 44 (Pitman, 1980).Google Scholar
4.Chatters, A. W. and Hajarnavis, C. R., Ideal arithmetic in Noetherian PI rings, J. Algebra 122 (1989), 475480.Google Scholar
5.Goodearl, K. R. and Warfield, R. B. Jr, An introduction to noncommutative Noetherian rings, London Mathematical Society Student Texts 16 (Cambridge University Press, 1989).Google Scholar
6.Hajarnavis, C. R. and Lenagan, T. H., Localisation in Asano orders, J. Algebra 21 (1972), 441449.CrossRefGoogle Scholar
7.Hajaranavis, C. R., One sided invertibility and localisation, Glasgow Math. J. 34 (1992), 333339.CrossRefGoogle Scholar
8.Robson, J. C., Non-commutative Dedekind rings, J. Algebra 9 (1968), 249265.Google Scholar
9.Stafford, J. T., unpublished.Google Scholar