LIE IDEALS, MORITA CONTEXT AND GENERALIZED (α, β)-DERIVATIONS

LIE IDEALS, MORITA CONTEXT AND GENERALIZED (α, β)-DERIVATIONS

下载PDF

导出

摘要 A classical problem in ring theory is to study conditions under which a ring is forced to become commutative. Stimulated from Jacobson＇s famous result, several tech- niques are developed to achieve this goal. In the present note, we use a pair of rings, which are the ingredients of a Morita context, and obtain that if one of the ring is prime with the generalized （α β）-derivations that satisfy certain conditions on the trace ideal of the ring, which by default is a Lie ideal, and the other ring is reduced, then the trace ideal of the reduced ring is contained in the center of the ring. As an outcome, in case of a semi-projective Morita context, the reduced ring becomes commutative. A classical problem in ring theory is to study conditions under which a ring is forced to become commutative. Stimulated from Jacobson＇s famous result, several tech- niques are developed to achieve this goal. In the present note, we use a pair of rings, which are the ingredients of a Morita context, and obtain that if one of the ring is prime with the generalized （α β）-derivations that satisfy certain conditions on the trace ideal of the ring, which by default is a Lie ideal, and the other ring is reduced, then the trace ideal of the reduced ring is contained in the center of the ring. As an outcome, in case of a semi-projective Morita context, the reduced ring becomes commutative.

作者 S.Khalid NAUMAN Nadeem ur REHMAN R.M.AL-OMARY

机构地区 Department of Mathematics Department of Mathematics Department of Mathematics

出处《Acta Mathematica Scientia》 SCIE CSCD 2013年第4期1059-1070,共12页 数学物理学报（B辑英文版）

关键词 prime rings （α β）-derivations and generalized （α β）-derivations Lie ideals Morita context prime rings （α β）-derivations and generalized （α β）-derivations Lie ideals Morita context

分类号 O152.5 [理学—基础数学]

引文网络
相关文献

参考文献8

1Bell H E, Rehman N. Generalized derivations with commutativity and anti-commutativity conditions. Math J Okayama Univ, 2007, 49:139-147.
2Bergen J, Herstein I N, Kerr J W. Lie ideals and derivations of prime rings. J Algebra, 1981, 71:259-267.
3Jacobson N. Structure theory of algebraic algebras of bounded degree. Ann Math, 1945, 46(4): 695-707.
4Muthana N, Nauman S K. Reduced rings, Morita contexts and derivations. East-West. J Math, 2008, 10(2): 179-186.
5Nauman S K. Morita similar matrix rings and their Grothendieck groups. Alig Bull Math, 2004, 23:49-60.
6Pinter-Lucke J. Commutativity conditions for rings 1950-2005. Expo Math, 2007, 25:165-174.
7Rehman N. On commutativity of rings with generalized derivations. Math J Okayama Univ, 2002, 44: 43-49.
8Rehman N, A1-Omary R M. Centralizing mappings of prime rings with generalized derivation in prime ring. Preprint.

1张元婷.环F_(p^m)+uF_(p^m)+vF_(p^m)上长为p^k的(β+γu)-常循环码[J].蚌埠学院学报,2016,5(4):32-35.
2郭世乐.关于强欧氏环的注记[J].福建师大福清分校学报,1999,17(2):53-54. 被引量：1
3陈淼森.关于Perfect环的一个注记(英文)[J].Journal of Mathematical Research and Exposition,1993,13(3):372-374.
4张良云.弱Hopf代数上的Maschke定理和Morita关系[J].中国科学（A辑）,2006,36(2):192-203. 被引量：9
5庄玉萍.信息技术在小学数学课堂教学中的应用[J].教育界（教师培训）,2016,0(2):33-33.
6代数学[J].中国学术期刊文摘,2005,11(23):1-1.
7薛卫民,王德生.关于《环的拟同构关系》的一个注记(英文)[J].松辽学刊（自然科学版）,1992(1):20-22.
8王栓宏,李金其.余模代数的Morita关系[J].复旦学报（自然科学版）,1994,33(6):643-646. 被引量：3
9徐光甫,张玉峰.微积分理论中一个遗留的古典问题[J].延边大学学报（自然科学版）,1998,24(1):68-70.
10马秀娟.非交换矩问题[J].中国科学（A辑）,2005,35(6):633-640.

Acta Mathematica Scientia

2013年第4期

浏览历史

内容加载中请稍等...

LIE IDEALS, MORITA CONTEXT AND GENERALIZED (α, β)-DERIVATIONS

参考文献8

相关作者

相关机构

相关主题

浏览历史