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Semigroup ideals in rings

Part of: Semigroups

Published online by Cambridge University Press:  09 April 2009

David A. Hill
David A. Hill*
Affiliation:
Trinity CollegeDublin, Ireland and Universidad Nacional Experimental de Tachira San Cristobal, Venezuela
*
Instituto de Matematica Universidade Federal de Bahia Caetano Moura, 99, Federação 40000 Salvador, Bahia Brasil
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Abstract

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A ring R is called an l-ring (r-ring) in case R contains an indentity and every left (right) semigroup ideal is a left (right) ring ideal. A number of structure theorems are obtained for l-rings when R is left noetherian and left artinian. It is shown that left noetherian l-rings are local left principal ideal rings. When R is a finite dimensional algebra over a field, the property of being an l-ring is equivalent to being an r-ring. However, examples are given to show that these two concepts are in general not equivalent even in the artinian case.

MSC classification

Secondary: 20M10: General structure theory
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 27 , Issue 1 , February 1979 , pp. 51 - 58
Copyright
Copyright © Australian Mathematical Society 1979

References

Dlab, V. and Ringel, C. M. (1972), ‘A class of balanced non-uniserial rings’, Math. Ann. 195, 279291.CrossRefGoogle Scholar
Gluskin, L. M. (1960), ‘Ideals in rings and their multiplicative semigroups’, Uspehi Mat. Nauk (N.S.)1t, 141148,Google Scholar
translated in Amer. Math. Soc. Transl. 27 (2), 1963, 297304.Google Scholar
Goldie, A. W. (1962), ‘Non-commutative principal ideal rings’, Arch. Math. 13, 213221.CrossRefGoogle Scholar
Lambek, J. (1966), Lectures in rings and modules (Blaisdell, Waltham, Mass., U.S.A.).Google Scholar
Nakayama, T. (1940), ‘Note on uniserial and generalized uniserial rings’, Proc. Imp. Soc. Japan 16, 285289.Google Scholar