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On prime K - ideals of hemirings
In hemiring, out of six prime ideals [PI(S)], it is established that it reduces in to four prime ideals [PI(S)] when the ideal is k - prime ideal [KPI(S)]. It is proved that the prime k – ideals [PKI(S)] coincide with 1 - prime ideal [IPI(S)], 2 - prime ideal [2PI(S)] when the ideal [I(S)] is k – id...
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| Main Authors: | , |
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| Format: | Conference Proceeding |
| Language: | English |
| Online Access: | Get full text |
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| Summary: | In hemiring, out of six prime ideals [PI(S)], it is established that it reduces in to four prime ideals [PI(S)] when the ideal is k - prime ideal [KPI(S)]. It is proved that the prime k – ideals [PKI(S)] coincide with 1 - prime ideal [IPI(S)], 2 - prime ideal [2PI(S)] when the ideal [I(S)] is k – ideal [KI(S)]. It is established that thirteen necessary and sufficient conditions for a k – ideal [KI(S)] to be prime k – ideal [PKI(S)] (1 – prime ideal [1PI(S)], 2 - prime ideal [2PI(S)]). Examples are given to validate our results. |
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| ISSN: | 0094-243X 1551-7616 |
| DOI: | 10.1063/5.0109904 |