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1.
对Π_k空间上一般对称算子代数,给出了对称理想的结构的两个结果.(1)令A是Π_k空间上一般对称算子代数.若M_1∩M_2≠{0},则存在对■~((k))不变的子空间V∈~(k)H~(k),满足M_1∩M_2=F(V) J,这里J=(■),T属于k×k矩阵代数,V=(R){VXX│X∈D},R和R⊥是对*-算子代数A_p~(k)不变的.(2)令A是Π_k空间上一般对称算子代数.设△=M_1∩M_2≠{0}.则M_2:△ U(Q),其中U(Q)是下列元的集(■),这里B∈A_p,q_i是算子代数U到R~⊥的线性映射,并满足条件:q(A B)=Aq(B),A,B∈A_p.  相似文献   

2.
杨海涛 《数学年刊A辑》2007,28(1):103-110
对∏κ空间上一般对称算子代数,给出了对称理想的结构的两个结果.(1)令A是∏κ空间上一般对称算子代数.若M1 ∩ M2≠{0},则存在对(I)(κ)不变的子空间v∈(H)(κ)⊕H(κ),满足M1∩M2=F(v)+J,这里J=(0 00 T0 0),T属于κ×κ矩阵代数,v=((R)⊕R)⊕{VX⊕X|X∈D},R和R⊥是对*-算子代数Ap(κ)不变的.(2)令A是∏κ空间上一般对称算子代数.设△=M1∩M2≠{0}.则M2=△+u(Q),其中u(Q)是下列元的集(0k∑i=1 qi(B*)(⊕)ei 0 B k∑i=1e*i(⊕)qi(B)0).这里B∈Ap,qi是算子代数u到R⊥的线性映射,并满足条件q(AB)=Aq(B),A,B∈Ap.  相似文献   

3.
Pontrjagin空间上算子代数理想的对称性   总被引:3,自引:0,他引:3  
杨海涛 《数学学报》2004,47(5):915-920
本文证明了非退化的JC*-代数和非退化的JVN-代数的理想必是对称的.对退化的JC*-代数给出两种对称的理想和两种非对称的理想,说明了π1空间上JVN-代数除了第三类代数外无非对称理想,还构造两个关于JC*-代数理想对称性的例子.  相似文献   

4.
杨海涛 《数学学报》2006,49(4):857-860
本文研究Pontrjagin空间上一般算子代数弱闭和一致闭的等价条件,得到定理:设C0(U),C1(U,L,R,D,V),C2a(U),C2b(U,R),C3a(U),C3b(U,R)分别是Ⅱk空间上第0,Ⅰ,Ⅱa,Ⅱb,Ⅲa和Ⅲb类的算子代数,则(1)C0(U),C2a(U)或C3a(U)为一致闭(弱闭)的等价条件是U是Hibert空间G上的C*-代数(W*-代数;(2)C1(U,L,R,D,V)为一致闭(弱闭)的等价条件是U是Hibert空间H上的C*-代数(W*-代数),并且R是闭子空间,V是闭算子,L对称闭的;(3)C2b(U,R)或C3b(U,R)为一致闭(弱闭)的等价条件是U是Hibert空间H上的C*-代数(W*-代数),并且R是闭子空间.  相似文献   

5.
Kaplansky稠密性定理 ̄[1]是vonNeumann代数和C ̄*代数理论中一个基本而重要的定理。算子代数中许多深刻的结果都是以此为工具导出的。要在不定度规空间上探讨算子代数的性质,人们自然会关心在这类空间上是否存在同一类型的结果。本文的主要目的就是在Pontrjagin空间上给出一个相应的稠密性定理。同时,我们还将给出关于完全正则自共轭算子的另一个稠密性的结果。  相似文献   

6.
本文讨论Pontrjagin空间上的一致闭对称算子代数,给出在交换情况下它与通常C*代数的关系,在连续同态下的谱映射公式以及闭双侧理想的对称性。  相似文献   

7.
杨海涛 《数学年刊A辑》2005,26(1):105-112
本文证明Pontrjagin空间上非退化的J.V.N代数的导子是内的等价于它在该代数的奇异部分上的限制为零.对退化的J.V.N代数,证明了Ⅱ1空间第0,Ⅱa和Ⅲa类J.V.N代数上的导子是内的.通过构造例子说明了第Ⅰ,Ⅱb和Ⅲb类对称代数上的导子一般不是内的.  相似文献   

8.
本文证明Pontrjagin空间上非退化的J.V.N代数的导子是内的等价于它在该代数的奇异部分上 的限制为零.对退化的J.V.N代数,证明了Ⅱ1空间第0,Ⅱa和Ⅲa类J.V.N代数上的导子是内 的.通过构造例子说明了第Ⅰ,Ⅱb和Ⅲb类对称代数上的导子一般不是内的.  相似文献   

9.
10.
杨海涛  苏桂贤 《数学学报》2006,49(2):451-458
证明了:当Pontrjagin空间上的正规算子A没有零性不变子空间时,Putnam- Fuglede定理成立;当正规算子A有零性不变子空问时,通过构造反例说明此时Putnam- Fuglede定理不成立,并对Π1空间上算子相关的交换性条件进行了讨论,得到了Π1空间上算子代数的二次交换定理.  相似文献   

11.
12.
In this paper, we introduced the hyperreflexivity of operator algebra A on'Banach space, discussed the necessary, and sufficient condition that A is hyperreflexive, the estimate of hyperreflexive constant and the invariance of hyperreflexivety under the similarity transformation.  相似文献   

13.
Let G be a locally compact abelian group and let be a representation of G by means of isometries on a Banach space. We define WT as the closure with respect to the weak operator topology of the set where is the Fourier transform of fL1(G) with respect to the group T. Then WT is a commutative Banach algebra. In this paper we study semisimlicity problem for such algebras. The main result is that if the Arveson spectrum sp(T) of T is scattered (i.e. it does not contain a nonempty perfect subset) then the algebra WT is semisimple. Some related problems are also discussed.  相似文献   

14.
We give a general criterion for conformal embeddings of vertex operator algebras associated to affine Lie algebras at arbitrary levels. Using that criterion, we construct new conformal embeddings at admissible rational and negative integer levels. In particular, we construct all remaining conformal embeddings associated to automorphisms of Dynkin diagrams of simple Lie algebras. The semisimplicity of the corresponding decompositions is obtained by using the concept of fusion rules for vertex operator algebras.  相似文献   

15.
A proof is given to show that the operator Hilbert space OHdoes not embed completely isomorphically into the predual ofa semi-finite von Neumann algebra. This complements Junge'srecent result, which admits such an embedding in the non-semi-finitecase. 2000 Mathematics Subject Classification 46L07, 46L54,47L25, 47L50.  相似文献   

16.
An algebra of operators on a Banach space X is said to be transitive if X has no nontrivial closed subspaces invariant under every member of the algebra. In this paper we investigate a number of conditions which guarantee that a transitive algebra of operators is “large” in various senses. Among these are the conditions of algebras being localizing or sesquitransitive. An algebra is localizing if there exists a closed ball B ∌ 0 such that for every sequence (x n ) in B there exists a subsequence and a bounded sequence (A k ) in the algebra such that converges to a non-zero vector. An algebra is sesquitransitive if for every non-zero zX there exists C > 0 such that for every x linearly independent of z, for every non-zero yX, and every there exists A in the algebra such that and ||Az|| ≤ C||z||. We give an algebraic version of this definition as well, and extend Jacobson’s density theorem to algebraically sesquitransitive rings. The second and the third authors were supported by NSERC.  相似文献   

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