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Extensions of McCoy Rings 被引量:8
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作者 应志领 陈建龙 雷震 《Northeastern Mathematical Journal》 CSCD 2008年第1期85-94,共10页
A ring R is said to be right McCoy if the equation f(x)g(x) = 0, where y(x) and g(x) are nonzero polynomials of R[x], implies that there exists nonzero s E R such that f(x)s = 0. It is proven that no proper ... A ring R is said to be right McCoy if the equation f(x)g(x) = 0, where y(x) and g(x) are nonzero polynomials of R[x], implies that there exists nonzero s E R such that f(x)s = 0. It is proven that no proper (triangular) matrix ring is one-sided McCoy. It is shown that for many polynomial extensions, a ring R is right Mccoy if and only if the polynomial extension over R is right Mccoy. 展开更多
关键词 matrix ring McCoy ring polynomial ring upper triangular matrix ring
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Extensions of strongly π-regular general rings
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作者 王周 陈建龙 《Journal of Southeast University(English Edition)》 EI CAS 2007年第2期309-312,共4页
The concept of the strongly π-regular general ring (with or without unity) is introduced and some extensions of strongly π-regular general rings are considered. Two equivalent characterizations on strongly π- reg... The concept of the strongly π-regular general ring (with or without unity) is introduced and some extensions of strongly π-regular general rings are considered. Two equivalent characterizations on strongly π- regular general rings are provided. It is shown that I is strongly π-regular if and only if, for each x ∈I, x^n =x^n+1y = zx^n+1 for n ≥ 1 and y, z ∈ I if and only if every element of I is strongly π-regular. It is also proved that every upper triangular matrix general ring over a strongly π-regular general ring is strongly π-regular and the trivial extension of the strongly π-regular general ring is strongly clean. 展开更多
关键词 strongly π-regular general ring strongly clean general ring upper triangular matrix general ring trivial extension
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Extensions of McCoy Rings Relative to a Monoid 被引量:6
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作者 YANG Shi Zhou SONG Xue Mei 《Journal of Mathematical Research and Exposition》 CSCD 北大核心 2008年第3期659-665,共7页
For a monoid M, we introduce M-McCoy rings, which are generalization of McCoy rings, and we investigate their properties. Every M-Armendariz ring is M-McCoy for any monoid M. We show that R is an M-McCoy ring if and o... For a monoid M, we introduce M-McCoy rings, which are generalization of McCoy rings, and we investigate their properties. Every M-Armendariz ring is M-McCoy for any monoid M. We show that R is an M-McCoy ring if and only if an n × n upper triangular matrix ring αUTn (R) over R is an M-McCoy ring for any monoid M. It is proved that if R is McCoy and R[x] is M-McCoy, then R[M] is McCoy for any monoid M. Moreover, we prove that if R is M-McCoy, then R[M] and R[x] are M-McCoy for a commutative and cancellative monoid M that contains an infinite cyclic submonoid. 展开更多
关键词 MONOID unique product monoid McCoy ring M-McCoy ring upper triangular matrix ring.
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On Skew McCoy Rings 被引量:1
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作者 Xue Mei SONG Xu Dong LI Shi Zhou YANG 《Journal of Mathematical Research and Exposition》 CSCD 2011年第2期323-329,共7页
For a ring endomorphism α,we introduce α-skew McCoy rings which are generalizations of α-rigid rings and McCoy rings,and investigate their properties.We show that if α t = I R for some positive integer t and R is ... For a ring endomorphism α,we introduce α-skew McCoy rings which are generalizations of α-rigid rings and McCoy rings,and investigate their properties.We show that if α t = I R for some positive integer t and R is an α-skew McCoy ring,then the skew polynomial ring R[x;α] is α-skew McCoy.We also prove that if α(1) = 1 and R is α-rigid,then R[x;α]/ x 2 is αˉ-skew McCoy. 展开更多
关键词 McCoy ring skew McCoy ring skew polynomial ring rigid ring skew Armendariz ring upper triangular matrix ring
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Remarks on Centers of Rings
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作者 Juan Huang Hailan Jin +2 位作者 Tai Keun Kwak Yang Lee Zhelin Piao 《Algebra Colloquium》 SCIE CSCD 2021年第1期1-12,共12页
It is proved that for matrices A,B in the n by n upper triangular matrix ring T_(n)(R)over a domain R,if AB is nonzero and central in T_(n)(R)then AB=BA.The n by n full matrix rings over right Noetherian domains are a... It is proved that for matrices A,B in the n by n upper triangular matrix ring T_(n)(R)over a domain R,if AB is nonzero and central in T_(n)(R)then AB=BA.The n by n full matrix rings over right Noetherian domains are also shown to have this property.In this article we treat a ring property that is a generalization of this result,and a ring with such a property is said to be weakly reversible-over-center.The class of weakly reversible-over-center rings contains both full matrix rings over right Noetherian domains and upper triangular matrix rings over domains.The structure of various sorts of weakly reversible-over-center rings is studied in relation to the questions raised in the process naturally.We also consider the connection between the property of being weakly reversible-over-center and the related ring properties. 展开更多
关键词 weakly reversible-over-center ring CENTER commutative domain right Noetherian domain reduced ring full(upper)triangular matrix ring NI ring
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