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Localization and Completion at Primes Generated by Normalizing Sequences in Right Noetherian Rings

Published online by Cambridge University Press:  20 November 2018

A. G. Heinicke*
Affiliation:
University of Western Ontario, London, Ontario
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If P is a right localizable prime ideal in a right Noetherian ring R, it is known that the ring RP is right Noetherian, that its Jacobson radical is the only maximal ideal, and that RP/J(RP) is simple Artinian: in short it has several properties of the commutative local rings.

In the present work we examine the properties of RP under the additional assumption that P is generated by, or is a minimal prime above, a normalizing sequence. It is shown that in such cases J(RP) satisfies the AR-property (i.e., P is classical) and that the rank of P coincides with the Krull dimension of RP. The length of the normalizing sequence is shown to be an upper bound for the rank of P, and if P is generated by a normalizing sequence x1, x2, …, xn then the rank of P equals n if and only if the P-closures of the ideals Ij generated by x1, x2, …, xj (j = 0, 1, …, n), are all distinct primes.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1981

References

1. Cohn, P. M., Skew field constructions (Cambridge University Press, Cambridge, London, New York, Melbourne, 1977).Google Scholar
2. Cozzens, J. H. and Sandomierski, F. L., Localization at a semiprime ideal of a right Noetherian ring, Comm. Algebra 5 (1977), 707726.Google Scholar
3. Deshpande, V. K., Completions of Noetherian hereditary prime rings, Pac. J. Math. 90 (1980), 285325.Google Scholar
4. Gordon, R. and Robson, J. C., Krull dimension, Mem. Amer. Math. Soc. 133 (1973).Google Scholar
5. Faith, C., Algebra II: ring theory (Springer-Verlag, Berlin, Heidelberg, New York, 1976).Google Scholar
6. Heinicke, A. G., On the ring of quotients at a prime ideal of a right Noetherian ring, Can. J. Math. 24 (1972), 703712.Google Scholar
7. Jategaonkar, A. V., Relative Krull dimension and prime ideals in right Noetherian rings, Comm. Algebra 2 (1974), 429468.Google Scholar
8. Jategaonkar, A. V., Infective modules and localization in non-commutative Noetherian rings, Trans. A.M.S. 190 (1974), 109123.Google Scholar
9. Jategaonkar, A. V., Certain infectives are Artinian, in Non-commutative ring theory, Lecture Notes in Mathematics 545 (Springer-Verlag, Berlin, Heidelberg, New York, 1976).Google Scholar
10. Lambek, J. and Michler, G., The torsion theory at a prime ideal of a right Noetherian ring, J. Algebra 25 (1973), 364389.Google Scholar
11. Lambek, J. and Michler, G., Localization of right Noetherian rings at semiprime ideals, Can. J. Math. 26 (1974), 10691085.Google Scholar
12. Ludgate, A. T., A note on non-commutative Noetherian rings, J. London Math. Soc. 5 (1972), 406408.Google Scholar
13. McConnell, J. C., Localization in enveloping rings, J. London Math Soc. Ifi (1968), 421-428: erratum and addendum, J. London Math Soc. 3 (1971), 409410.Google Scholar
14. McConnell, J. C., The Noetherian property in complete rings and modules, J. Algebra 12 (1969), 143153.Google Scholar
15. McConnell, J. C., On completions of non-commutative Noetherian rings, Comm. Algebra 6 (1978), 14851488.Google Scholar
16. Mueller, B. J., Linear compactness and Morita duality, J. Algebra 16 (1970), 6066.Google Scholar
17. Mueller, B. J., Localization in non-commutative Noetherian rings, Can. J. Math. 28 (1976), 600610.Google Scholar
18. Passman, D. S., The algebraic structure of group rings (John Wiley and Sons, New York, 1977).Google Scholar
19. Rentschler, R. and Gabriel, P., Sur la dimension des anneaux et ensembles ordonnes, C. R. Acad. Sci. Paris 265 (1967), 712715.Google Scholar
20. Rosenberg, A. and Zelinsky, D., On the finiteness of the infective hull, Math. Z. 70 (1959), 327380.Google Scholar
21. Smith, P. F., Localization and the Artin-Rees property, Proc. London Math. Soc. 22 (1971), 3968.Google Scholar
22. Smith, P. F., Onnon-commutative regular local rings, Glasgow Math. J. 17 (1976), 98102.Google Scholar
23. Walker, R., Local rings and normalizing sets of elements, Proc. London Math. Soc. 24 (1972), 2745.Google Scholar
24. Varnos, P., Semi-local Noetherian Wrings, Bull. London Math Soc. 9 (1977), 251256.Google Scholar