摘要
利用循环BCI-代数,研究了根BCI-代数的结构,得到任一有限根BCI-代数X=B_1×B_2×…×B_n,其中B_i为n_i阶循环子代数。而且任一具有有限生成元的根BCI-代数X=(a_1)×(a_2)×…×(a_n),(a_i),为循环子代数。
Utilizing, the circulating BCI - algebra this article studied the structure of radical BCI - algebra and achieved a randomly finite BCI - algebra the X = B1×B2×…×Bn > among them Bi as the ni rank circulating algebra of subsets. At the same time any radical BCI - algebra with the finitely generated elements, the X = (a1) ×(a2)×…×(an),(ai) is the circulating algebra of subsets.
出处
《河北大学学报(自然科学版)》
CAS
2003年第1期7-10,共4页
Journal of Hebei University(Natural Science Edition)
