摘要
目的研究clean环和exchange环的关系。方法环R被称为clean环,若环R中每一个元素都能写成一个幂等元和一个单位的和。通过减弱了"R是左拟-duo环"的条件,来研究clean环和exchange环的关系。结果证明了,如果"R的任意极大左理想是GW-理想"、"R的任意极大左理想是拟理想"、"R的任意极大左理想是弱右理想"以及"R的任意补左理想是理想",那么R是exchange环当且仅当R是clean环。结论在减弱"R是左拟-duo环"得到的一些条件下,R是exchange环当且仅当R是clean环成立。
Aim To investigate the relationship between clean ring and exchange ring. Methods A ringR is said to be clean if every element can be written as a sum of an idempotent and a unit. The relationship between clean ring and exchange ring is investigated by weakening the condition that R is a left quasi-duo ring. Results Some conditions are proved. If every maximal left ideal of R is a GW-ideal, every maximal left ideal of R is a quasi-ideal, every maximal left ideal of R is a weakly right ideal, every complement left ideal of R is an ideal, R is exchange if and only if it is clean. Conclusion It is true that R is an exchange ring if and only if it is clean, by weakening the condition that R is a left quasi-duo ring.
出处
《宝鸡文理学院学报(自然科学版)》
CAS
2010年第1期6-7,10,共3页
Journal of Baoji University of Arts and Sciences(Natural Science Edition)
