检索规则说明:AND代表“并且”;OR代表“或者”;NOT代表“不包含”;(注意必须大写,运算符两边需空一格)
检 索 范 例 :范例一: (K=图书馆学 OR K=情报学) AND A=范并思 范例二:J=计算机应用与软件 AND (U=C++ OR U=Basic) NOT M=Visual
名 称:
注 释:
机构地区:[1]山东工商学院数学与信息科学学院,山东烟台264005
出 处:《邯郸学院学报》2008年第3期43-46,共4页Journal of Handan University
基 金:山东省自然科学基金资助课题(课题编号:Y2006A17)
摘 要:环是指具有单位元的结合环,而一般环是指有或没有单位元的结合环.一般环I称为是强Clean的,如果I中每个元素a具有下述的形式a=e+q,其中e^2=e∈I,q∈Q(I)={q∈I|q+p+pq=p+q+pq=0对某个p∈I}且eq=qe.这一概念是Nicholson中强Clean环概念的真推广,强Clean一般环的刻画给出了。基于此,证明了强Clean一般环的单边理想也是强Clean的,并证明了如果I是强Clean一般环,那么,对于任意x∈I,I在x处的局部环I_x也是强Clean的,特别地,强Clean一般环的角落子环eRe总是强Clean的对于任意的e^2=e∈I.这推广了Chen中的主要结果.By a ring we mean an associative ring with unity and a general ring we mean a ring with or without unity. A general ring I is called strongly clean if each element a of I has the form a=e+q where e^2=e ∈ I, q∈Q(I) = q∈ I: q+p+qp = p+q+pq =0 for some p∈I with eq = qe. This notion is a proper generalization of that of a strongly clean ring in Nicholson. A characterization of a strongly clean general ring is given. Based on this, it is proved that any one-sided ideal of a strongly clean general ring is also strongly clean and that if I is a strongly clean ring, then so is the local ring Ix of I at x. In particular, the comer subring eRe of a strongly clean general ring is strongly clean for any e2 = e, which generalizes the main result in Chen.
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在载入数据...
正在链接到云南高校图书馆文献保障联盟下载...
云南高校图书馆联盟文献共享服务平台 版权所有©
您的IP:216.73.216.44