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On questions of B. J. Gardner and A. D. Sands

Part of: Radicals and radical properties of rings

Published online by Cambridge University Press:  09 April 2009

K. I. Beidar
K. I. Beidar
Affiliation:
Department of Algebra, Moscow State University, 117234 Moscow, USSR
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Abstract

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An example of two disjoint special classes whose upper radicals coincide is presented. It is shown that the left hereditary subradical of the hereditary idempotent radical is right hereditary. An example of a hereditary and principally left hereditary radical which is not left hereditary is constructed.

MSC classification

Secondary: 16N80: General radicals and rings
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 56 , Issue 3 , June 1994 , pp. 314 - 319
Copyright
Copyright © Australian Mathematical Society 1994

References

[1]Anderson, T., Divinsky, N. and Sulinski, A., ‘Hereditary radicals in associative and alternative rings’, Canad. J. Math. 17 (1965), 594603.Google Scholar
[2]Andrunakievich, V. A. and Ryabukhin, Ju. M., Radicals in algebras and structural theory (Nauka, Moscow, 1979) (in Russian).Google Scholar
[3]Beidar, K. I., ‘Atoms in the lattice of radicals’, Mat. Issled. 85 (1985), 2131 (in Russian).Google Scholar
[4]Divinsky, N., Rings and radicals (Allen and Unwin, London, 1965).Google Scholar
[5]Forsythe, A. and McCoy, N. H., ‘On the commutativity of certain rings’, Bull. Amer. Math. Soc. 52 (1946), 523526.Google Scholar
[6]Gardner, B. J. (ed.), Rings, modules and radicals, (Proceedings of the Hobart Conference, 1987), Research Notes in Mathematics 204 (Pitman, London, 1989).Google Scholar
[7]Goodearl, K. R., Von Neumann regular rings (Pitman, London, 1979).Google Scholar
[8]Heyman, G. A. P. and Roos, C., ‘Essential extension in radical theory of rings’, J. Austral. Math. Soc. (Series A) 23 (1977), 340347.CrossRefGoogle Scholar
[9]Sands, A. D., ‘Radical properties and one sided ideals’, in: Contribution to general algebra 4, Proceedings of the Krems Conferences 1985 (Hölder-Pichler-Temsky, Vienna, 1987) pp. 151171.Google Scholar
[10]Szász, F. A., Radicals of rings (Akadémiai Kiado, Budapest, 1981).Google Scholar
[11]Wiegandt, R., Radical and semisimple classes of rings, Queen's papers in pure and applied mathematics 37 (Kingston, Ontario, 1974).Google Scholar