Rings with annihilator chain conditions and right distributive rings
AUTOR(ES)
Ferrero, Miguel Angel Alberto
DATA DE PUBLICAÇÃO
2011
RESUMO
We prove that if a right distributive ring R, which has at least one completely prime ideal contained in the Jacobson radical, satisfies either a.c.c or d.c.c. on principal right annihilators, then the prime radical of R is the right singular ideal of R and is completely prime and nilpotent. These results generalize a theorem by Posner for right chain rings.
ASSUNTO(S)
aneis distributivos radicais primos : radicais jacobianos cadeia de aneis
ACESSO AO ARTIGO
http://hdl.handle.net/10183/27488Documentos Relacionados
- THE STRUCTURE OF PRIME RINGS WITH MAXIMUM CONDITIONS
- Comparative echocardiographic features of conditions presenting with symptomatic pulmonary hypertension and right ventricular hypertrophy in early infancy.
- Códigos cíclicos sobre anéis de cadeia
- Dysplastic conditions of the right ventricular myocardium: Uhl's anomaly vs arrhythmogenic right ventricular dysplasia.
- A note on jacobson rings and polynomial rings
