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Structure of weakly one-sided duo Ore extensions
- Issue Date
- Feb-2021
- Publisher
- SPRINGER INDIA
- Keywords
- Weakly left (right) duo ring; skew polynomial ring; ore extension; rigid endomorphism; commutative ring; radical; 16D25; 16S36; 16U80
- Citation
- PROCEEDINGS OF THE INDIAN ACADEMY OF SCIENCES-MATHEMATICAL SCIENCES, v.131, no.1
- Indexed
- SCIE
SCOPUS
- Journal Title
- PROCEEDINGS OF THE INDIAN ACADEMY OF SCIENCES-MATHEMATICAL SCIENCES
- Volume
- 131
- Number
- 1
- ISSN
- 0253-4142
0973-7685
- Abstract
- Marks (J. Algebra280 (2004) 463-471) proved that if the skew polynomial ring R[x;sigma] is left or right duo, then R[x;sigma] is commutative. It is proved that if R[x;sigma] is weakly left (resp., right) duo over a reduced ring R with an endomorphism (resp., a monomorphism) sigma, then R[x;sigma] is commutative. This concludes that a noncommutative skew polynomial ring is not weakly left duo when the base ring is reduced. It is also shown that if R[x;sigma] is weakly left duo then the polynomial ring R[x] is weakly left duo. We next study the structure of the Ore extension R[x;sigma,delta] when it is weakly left or right duo.
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