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Topological Rings of Quotients

Published online by Cambridge University Press:  20 November 2018

William Schelter
William Schelter*
Affiliation:
University of Leeds, Leeds, England
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We investigate here the notion of a topological ring of quotients of a topological ring with respect to an arbitrary Gabriel (idempotent) filter of right ideals. We describe the topological ring of quotients first as a subring of the algebraic ring of quotients, and then show it is a topological bicommutator of a topological injective R-module. Unlike R. L. Johnson in [6] and F. Eckstein in [2] we do not always make the ring an open subring of its ring of quotients. This would exclude examples such as C(X), the ring of continuous real-valued functions on a compact space, and its ring of quotients as described in Fine, Gillman and Lambek [3].

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 26 , Issue 5 , October 1974 , pp. 1228 - 1233
Copyright
Copyright © Canadian Mathematical Society 1974

References

1. Cassels, J. and Fröhlich, A., Algebraic number theory (Academic Press, New York, 1967).Google Scholar
2. Eckstein, F., Topologische Quotientringe und Ringe ohne Offene Links ideale, Habilitationschrift, Tech. Univ. Munich, 1972.Google Scholar
3. Fine, N., Gillman, L., and Lambek, J., Rings of quotients of rings of functions (McGill University Press, Montreal, 1965).Google Scholar
4. Gabriel, P., Des catégories abeliennes, Bull. Soc. Math. France 90 (1962), 323448.Google Scholar
5. Goldman, O. and Chi-Han, Sah, Locally compact rings of special type, J. Algebra 11 (1969), 363454.Google Scholar
6. Johnson, R. L., Rings of quotients of topological rings, Math. Ann. 179 (1969), 203211.Google Scholar
7. Lambek, J., Torsion theories, additive semantics, and rings of quotients, Lect. Notes in Math. 177 (Springer, Berlin, 1970).Google Scholar