| Conţinutul numărului revistei |
| Articolul precedent |
| Articolul urmator |
 |
 804 2 |
| Ultima descărcare din IBN: 2017-02-26 07:44 |
| Căutarea după subiecte similare conform CZU |
| 512.54+512.55 (6) |
| Algebră (410) |
 SM ISO690:2012BHAT, Vijay-Kumar. On 2-primal Ore extensions over Noetherian Weak sigma-rigid rings. In: Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica, 2014, nr. 2(75), pp. 51-59. ISSN 1024-7696. |
| EXPORT metadate: Google Scholar Crossref CERIF DataCite Dublin Core |
 Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica |
||||||
| Numărul 2(75) / 2014 / ISSN 1024-7696 /ISSNe 2587-4322 | ||||||
|
||||||
| CZU: 512.54+512.55 | ||||||
| Pag. 51-59 | ||||||
|
||||||
 Descarcă PDF |
||||||
| Rezumat | ||||||
Let R be a ring, σ an endomorphism of R and δ a σ -derivation of R . In this article, we discuss skew polynomial rings over 2-prima l weak σ -rigid rings. We show that if R is a 2-primal Noetherian weak σ -rigid ring, then R [ x ; σ, δ ] is a 2-primal Noetherian weak σ -rigid ring. |
||||||
| Cuvinte-cheie minimal prime, 2-primal, prime radical, weak sigma-rigid rings., automorphism, derivation |
||||||
|
Cerif XML Export
<?xml version='1.0' encoding='utf-8'?> <CERIF xmlns='urn:xmlns:org:eurocris:cerif-1.5-1' xsi:schemaLocation='urn:xmlns:org:eurocris:cerif-1.5-1 http://www.eurocris.org/Uploads/Web%20pages/CERIF-1.5/CERIF_1.5_1.xsd' xmlns:xsi='http://www.w3.org/2001/XMLSchema-instance' release='1.5' date='2012-10-07' sourceDatabase='Output Profile'> <cfResPubl> <cfResPublId>ibn-ResPubl-32826</cfResPublId> <cfResPublDate>2014-08-01</cfResPublDate> <cfVol>75</cfVol> <cfIssue>2</cfIssue> <cfStartPage>51</cfStartPage> <cfISSN>1024-7696</cfISSN> <cfURI>https://ibn.idsi.md/ro/vizualizare_articol/32826</cfURI> <cfTitle cfLangCode='EN' cfTrans='o'>On 2-primal Ore extensions over Noetherian Weak sigma-rigid rings</cfTitle> <cfKeyw cfLangCode='EN' cfTrans='o'>minimal prime; 2-primal; prime radical; automorphism; derivation; weak sigma-rigid rings.</cfKeyw> <cfAbstr cfLangCode='EN' cfTrans='o'>Let R be a ring, σ an endomorphism of R and δ a σ -derivation of R . In this article, we discuss skew polynomial rings over 2-prima l weak σ -rigid rings. We show that if R is a 2-primal Noetherian weak σ -rigid ring, then R [ x ; σ, δ ] is a 2-primal Noetherian weak σ -rigid ring. </cfAbstr> <cfResPubl_Class> <cfClassId>eda2d9e9-34c5-11e1-b86c-0800200c9a66</cfClassId> <cfClassSchemeId>759af938-34ae-11e1-b86c-0800200c9a66</cfClassSchemeId> <cfStartDate>2014-08-01T24:00:00</cfStartDate> </cfResPubl_Class> <cfResPubl_Class> <cfClassId>e601872f-4b7e-4d88-929f-7df027b226c9</cfClassId> <cfClassSchemeId>40e90e2f-446d-460a-98e5-5dce57550c48</cfClassSchemeId> <cfStartDate>2014-08-01T24:00:00</cfStartDate> </cfResPubl_Class> <cfPers_ResPubl> <cfPersId>ibn-person-33434</cfPersId> <cfClassId>49815870-1cfe-11e1-8bc2-0800200c9a66</cfClassId> <cfClassSchemeId>b7135ad0-1d00-11e1-8bc2-0800200c9a66</cfClassSchemeId> <cfStartDate>2014-08-01T24:00:00</cfStartDate> </cfPers_ResPubl> </cfResPubl> <cfPers> <cfPersId>ibn-Pers-33434</cfPersId> <cfPersName_Pers> <cfPersNameId>ibn-PersName-33434-3</cfPersNameId> <cfClassId>55f90543-d631-42eb-8d47-d8d9266cbb26</cfClassId> <cfClassSchemeId>7375609d-cfa6-45ce-a803-75de69abe21f</cfClassSchemeId> <cfStartDate>2014-08-01T24:00:00</cfStartDate> <cfFamilyNames>Bhat</cfFamilyNames> <cfFirstNames>Vijay-Kumar</cfFirstNames> </cfPersName_Pers> </cfPers> </CERIF>
|
|
|
