说明:双击或选中下面任意单词,将显示该词的音标、读音、翻译等;选中中文或多个词,将显示翻译。
您的位置:首页 -> 词典 -> 分次Levitzki根
1)  graded levitzki radical
分次Levitzki根
2)  Levitzki Radical
Levitzki根
1.
Let R be any associative ring with identity,specl(R) the set of all left prime ideals of R,L(R) Levitzki Radical and Sl(R) the set of all left prime ideals containing L(R).
设R是任意带单位元的结合环,L(R)表示Levitzki根,左素理想谱specl(R)是一个弱Zariski拓扑空间。
2.
In this paper we have studied the radicals of R\~G, the fixed point subring of a group ring R\, shch as Prime radical, Jacobson radical, Levitzki radical, N-radical and N~*-radical.
研究群环R[G]的不动点子环R[G]G各种根性质,包括素根、Jacobson根、Levitzki根、N根以及N 根等,并讨论该类子环的其它一些相关性质。
3.
We proved that LR+RLS , where L is the Levitzki radical of S , and we also remarked that if the nil Kegel s conjecture holds, then there exist no simple nil rings.
讨论环 R的极大子环 S的 Levitzki根的性质 ,证明若环 R有极大子环 S,则 LR S,RL S,其中 L是 S的 L evitzki根 。
3)  Levitzki nil radical
Levitzki诣零根
4)  graded Jacobson radical
分次Jacobson根
1.
The graded Jacobson radical of graded algebra;
分次代数的分次Jacobson根
2.
Making use of the classical methods in ring theory, we obtain the relations with regard to graded Jacobson radical and graded prime radical between a group graded ring and its finite normalized graded extension ring.
利用经典环论方法,得到一个群分次环与其有限正规分次扩张环之间关于分次Jacobson根和分次素根的关系,同时,给出了分次情形的Cutting down定理和Lying over定理。
3.
We show that r_G(B)=[W,r_G(A)V]=[Wr_G(A),V],r_G(A)=(V,r_G(B)W)=(Vr_G(B),W), where r_G is one of the following graded radicals:the graded prime radical;the graded Jacobson radical;the graded Koethe radical;the graded Levitzki radical;the graded strongly prime radical;the graded uniformly strongly prime radical.
本文证明τG(B):[W,ΥG(A)V]=【WΥc(A),V],ΥG(A)=(V,ΥG(B)W)=(VΥG(B),W)其中ΥG代表P_G(分次素根),J_G(分次Jacobson根),K_G(分次Koethe根),L_G(分次Levitzki根)和s_G(分次强素根),us_G(分次一致强素根)。
更多例句>>
5)  graded prime radical
分次素根
1.
Making use of the classical methods in ring theory, we obtain the relations with regard to graded Jacobson radical and graded prime radical between a group graded ring and its finite normalized graded extension ring.
利用经典环论方法,得到一个群分次环与其有限正规分次扩张环之间关于分次Jacobson根和分次素根的关系,同时,给出了分次情形的Cutting down定理和Lying over定理。
2.
We show that r_G(B)=[W,r_G(A)V]=[Wr_G(A),V],r_G(A)=(V,r_G(B)W)=(Vr_G(B),W), where r_G is one of the following graded radicals:the graded prime radical;the graded Jacobson radical;the graded Koethe radical;the graded Levitzki radical;the graded strongly prime radical;the graded uniformly strongly prime radical.
本文证明τG(B):[W,ΥG(A)V]=【WΥc(A),V],ΥG(A)=(V,ΥG(B)W)=(VΥG(B),W)其中ΥG代表P_G(分次素根),J_G(分次Jacobson根),K_G(分次Koethe根),L_G(分次Levitzki根)和s_G(分次强素根),us_G(分次一致强素根)。
6)  graded Koethe radical
分次Koethe根
1.
We show that r_G(B)=[W,r_G(A)V]=[Wr_G(A),V],r_G(A)=(V,r_G(B)W)=(Vr_G(B),W), where r_G is one of the following graded radicals:the graded prime radical;the graded Jacobson radical;the graded Koethe radical;the graded Levitzki radical;the graded strongly prime radical;the graded uniformly strongly prime radical.
本文证明τG(B):[W,ΥG(A)V]=【WΥc(A),V],ΥG(A)=(V,ΥG(B)W)=(VΥG(B),W)其中ΥG代表P_G(分次素根),J_G(分次Jacobson根),K_G(分次Koethe根),L_G(分次Levitzki根)和s_G(分次强素根),us_G(分次一致强素根)。
补充资料:分次
1.分定等次或位次。 2.指分为几次。 3.星辰运行的度次。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条