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1.
不可分素C^k—代数与本原C^*—代数的讨论   总被引:2,自引:0,他引:2  
张伦传 《数学进展》1997,26(2):143-146
本文证明:若A是不可分的素C^*-代数,且包含非0的Liminal遗传C^*-子代数,则A是本原C^*-代数,本文还给出了I型C^*-代数为本原C^*-代数的充要条件。  相似文献   

2.
本文讨论了无限维完备李代数的一些性质,由Virasoro代数,Kac-Moody代数构造了几类无限维完备李代数.同时给出了Kac-Moody代数及其广义抛物子代数的导子代数的刻划.证明了完备李代数的Loop扩张仍为完备李代数.  相似文献   

3.
本文讨论了无限继完备李代数的一些性质,由Virasoro代数,Kac-Moody代数构造了几类无限维完备李代数.同时给出了Kac-Moody代数及其广义抛物子代数的导子代数的刻划.证明了完备李代数的Loop扩张仍为完备李代数。  相似文献   

4.
决定了非扭仿射Kac-Moody代数中所有包含标准Borel子代数的子代数。  相似文献   

5.
张顺华 《数学年刊A辑》2000,21(5):609-612
设A是有限域k上的有限维tame遗传代数,X,Y,M是有限生成A模,如果X,Y不可分解,证明了存在Hall多项式gMXY.设L(A)是以有限生成不可分解模为基的自由Abel群,则L(A)是退化Ringel-Hall代数(A)1的Lie子代数,设L′(A)是L(A)的由单模生成的Lie子代数,m是齐次正则单模的长度,证明了当M不可分解且m不整除M的长度时,[M]∈L′(A).  相似文献   

6.
设A是有限域k上的有限维tame遗传代数,X,Y, M是有限生成A模,如果X,Y不可分解,证明了存在 Hall多项式GMXY.设 L(A)是以有限生成不可分解模为基的自由 Abel群,则 L(A)是退化 Ringel-Hall代数 H(A)1的 Lie子代数,设 L’(A)是 L(A)的由单模生成的 Lie子代数,m是齐次正则单模的长度,证明了当 M不可分解且m不整除 M的长度时,[M]∈ L’(A) z Q.  相似文献   

7.
研究典型李代数的子代数结构,利用矩阵方法决定了含幺可换环上n级一般线性李代数分别在2n级辛代数,2n级正交代数及2n 1级正交代数中的扩代数.  相似文献   

8.
本文研究零关系拟遗传代数A的模范畴与其正合Borel子代数B的模范畴之间的联系.证明了正合Borel子代数B的诱导模范畴完全含于A的好模范畴, 即好模诱导好模. 特别, 设A是具有纯粹强正合子代数B的零关系拟遗传代数,则A的特征模是B的特征模通过正合函子-BA的诱导模当且仅当内射B-模的诱导A-模作为B-模仍是内射的. 本文还证明了基拟遗传单列代数的正合Borel子代数是右单列的, 并且其特征模恰是它的正合Borel子代数的特征模的诱导模.  相似文献   

9.
设A是有限域上的型的遗传代数,(A)和C(A)分别表示A的Ringel-Hall代数和合成代数.该文证明了C(A)=其中和分别表示由预投射模和预内射模生成的子代数,是由C(A)中的正则元素生成的子代数.  相似文献   

10.
由算子构成的李代数在李代数理论中具有重要的应用,因而研究算子李代数及其子代数的代数结构就显得尤为重要.首先构造了无扭算子李代数g(G,M)的子代数L_1,L_2,g1,g2,然后给出了这些子代数的代数结构及一些重要应用.  相似文献   

11.
关于有理模和余理想子代数的性质   总被引:1,自引:0,他引:1  
张良云 《东北数学》2000,16(3):265-271
In this paper, for some used conceptions and notations, we see [1] and [2].§1. Rational Module and Its Exact Sequence In [1], Cai Chuanreng and Cheng Huixiang have proved that relative Hopf modules and rational modules are one by one corresponding. In [2], Zhang Liangyun has given the dual relationship between relative Hopf modules. Naturally, we have a question to ask: is the dual module of a rational module still a rational module? This answer is affirmative. Let H be a Hopf …  相似文献   

12.
13.
关于强奇异极大交换子代数   总被引:1,自引:0,他引:1  
王利广  温玉珍 《数学进展》2005,34(4):488-496
设M_1和M_2是有限的冯·诺依曼代数,τ_1和τ_2是M_1和M_2的正规的,忠实的,正规化的迹.假设A_1和A_2分别是M_1和M_2的极大交换子代数,E_(Ai)是由M_i到A_i 的保迹的条件期望(i=1,2).若E_(A1)和E_(A2)是渐近同态条件期望,则A_1■A_2是M_1■M_2的强奇异极大交换子代数.另外,我们证明了若A是没有原子的有限冯·诺依曼代数M_1的强奇异极大交换子代数,M_2是有限冯·诺依曼代数,则A是M_1和M_2的约化自由积M_1*M_2 的强奇异极大交换子代数.  相似文献   

14.
15.
张建华  曹怀信 《数学学报》2004,47(1):119-124
本文引入了Banach代数上线性映射的Lie不变子空间,给出了因子VonNeumann代数中套子代数上以导子空间为Lie不变子空间的线性映射的一般形式,研究了Lie导子与Lie自同构的概念及了Lie导子与Lie自同构半群的关系.  相似文献   

16.
LI  ZHENG-XING HAI  JIN-KE 《东北数学》2011,(3):227-233
Let G be a finite group, H ≤ G and R be a commutative ring with an identity 1R. Let CRG(H)={α ∈ RG|αh = hα for all h ∈ H), which is called the centralizer subalgebra of H in RG. Obviously, if H=G then CRG(H) is just the central subalgebra Z(RG) of RG. In this note, we show that the set of all H- conjugacy class sums of G forms an R-basis of CRG(H). Furthermore, let N be a normal subgroup of G and γthe natural epimorphism from G to G to G/N. Then γ induces an epimorphism from RG to RG, also denoted by % We also show that if R is a field of characteristic zero, then γ induces an epimorphism from CRG(H) to CRG(H), that is, 7(CRG(H)) = CRG(H).  相似文献   

17.
证明了因子von Neumann代数中的套子代数到其单位对偶双模内的每个弱连续的局部3-上循环都是3-上循环.  相似文献   

18.
Let \(\mathfrak g\) be a semisimple Lie algebra over a field \(\mathbb K\), \(\text{char}\left( \mathbb{K} \right)=0\), and \(\mathfrak g_1\) a subalgebra reductive in \(\mathfrak g\). Suppose that the restriction of the Killing form B of \(\mathfrak g\) to \(\mathfrak g_1 \times \mathfrak g_1\) is nondegenerate. Consider the following statements: ( 1) For any Cartan subalgebra \(\mathfrak h_1\) of \(\mathfrak g_1\) there is a unique Cartan subalgebra \(\mathfrak h\) of \(\mathfrak g\) containing \(\mathfrak h_1\); ( 2) \(\mathfrak g_1\) is self-normalizing in \(\mathfrak g\); ( 3) The B-orthogonal \(\mathfrak p\) of \(\mathfrak g_1\) in \(\mathfrak g\) is simple as a \(\mathfrak g_1\)-module for the adjoint representation. We give some answers to this natural question: For which pairs \((\mathfrak g,\mathfrak g_1)\) do ( 1), ( 2) or ( 3) hold? We also study how \(\mathfrak p\) in general decomposes as a \(\mathfrak g_1\)-module, and when \(\mathfrak g_1\) is a maximal subalgebra of \(\mathfrak g\). In particular suppose \((\mathfrak g,\sigma )\) is a pair with \(\mathfrak g\) as above and σ its automorphism of order m. Assume that \(\mathbb K\) contains a primitive m-th root of unity. Define \(\mathfrak g_1:=\mathfrak g^{\sigma}\), the fixed point algebra for σ. We prove the following generalization of a well known result for symmetric Lie algebras, i.e., for m=2: (a) \((\mathfrak g,\mathfrak g_1)\) satisfies ( 1); (b) For m prime, \((\mathfrak g,\mathfrak g_1)\) satisfies ( 2).  相似文献   

19.
Let A be a quasi-hereditary algebra with a strong exact Borel subalgebra. It is proved that for any standard semisimple subalgebra T there exists an exact Borel subalgebra B of A such that T is a maximal semisimple subalgebra of B. It is shown that the maximal length of flags of exact Borel subalgebras of A is the difference of the radium and the rank of Grothendic group of A plus 2. The number of conjugation-classes of exact Borel subalgebras is 1 if and only if A is basic; the number is 2 if and only if A is semisimple. For all other cases, this number is 0 or no less than 3. Furthermore, it is shown that all the exact Borel subalgebras are idempotent-conjugate to each other, that is, for any exact Borel subalgebras B and C of A, there exists an idempotent e of A, and an invertible element u of A, such that eBe = u-1eCeu.  相似文献   

20.
In issues bearing on the structure of universal algebras , derived structures, such as automorphism groups Aut , subalgebra lattices Sub , congruence lattices Con , etc., play an important part. On the other hand, in studying universal algebras by the means of model theory, of crucial importance is the question asking which elements of the derived structures under examination are expressible by one or other formulas in the elementary language. Problems concerning the interrelationship of algebras and their derived structures are treated for subalgebras of universal algebras.Supported by RFBR grant No. 02-01-00258.__________Translated from Algebra i Logika, Vol. 44, No. 4, pp. 474–482, July–August, 2005.  相似文献   

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