Primal ideals and isolated components in non-commutative rings
In any associative ring R an element x is not right prime (nrp) to an ideal A if yRx ≤ A for some y [symbol omitted] A. An ideal is primal if the elements nrp to it form an ideal. These definitions differ from those of Curtis (American Journal of Mathematics, vol. 76 (1952), pp. 687-700) but reduce...
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| Language: | English |
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University of British Columbia
2012
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| Online Access: | http://hdl.handle.net/2429/40787 |