共查询到20条相似文献,搜索用时 296 毫秒
1.
在上半复平面H上给定双曲测度dxdy/y2,群G=PSL2(R)在H上的分式线性作用导出了G在Hilbert空间L2(H,dxdy/y2)上的酉表示α.证明了交叉积R(A,α)是Ⅰ型von Neumann代数,其中A={Mf:f∈L∞(H,dxdy/y2)}.具体地,交叉积代数R(A,α)与von Neumann代数B(L2(P,v))-(×)LK是*-同构的,其中LK是G中子群K的左正则表示生成的群von Neumann代数. 相似文献
2.
设H是复Hilbert空间,B(H)表示H上所有有界线性算子构成的代数.本文刻划了B(H)上保正交性的可加映射和von Neumann代数上与运算|·|κ交换的可加映射. 相似文献
3.
在上半复平面$\mathbb{H}$上给定双曲测度$dxdy/y^{2}$, 群$G={\rm PSL}_{2}(\mathbb{R})$ 在$\mathbb{H}$上的分式线性作用导出了$G$在Hilbert空间$L^{2}(\mathbb{H}, dxdy/y^{2})$上的酉表示$\alpha$. 证明了交叉积 $\mathcal{R}(\mathcal{A}, \alpha)$是$\mathrm{I}$型von Neumann代数, 其中$\mathcal{A}= \{M_{f}:f\in L^{\infty}(\mathbb{H},dxdy/y^{2} )\}$. 具体地, 交叉积代数$\mathcal{R}(\mathcal{A}, \alpha)$与von Neumann代数$\mathcal{B}(L^{2}(P, \nu))\overline{\otimes}\mathcal{L}_{K}$是*-同构的, 其中$\mathcal{L}_{K}$是$G$中子群 $K$的左正则表示生成的群von Neumann代数. 相似文献
4.
保正交性或与|·|~k交换的可加映射 总被引:2,自引:0,他引:2
设H是复Hilbert空间,B(H)表示H上所有有界线性算子构成的代数.本文刻划了B(H)上保正交性的可加映射和von Neumann代数上与运算|·|k交换的可加映射. 相似文献
5.
设H是复Hilbert空间,B(H)表示H上所有有界线性算子构成的代数.本文刻划了B(H)上保正交性的可加映射和von Neumann代数上与运算|·|k交换的可加映射. 相似文献
6.
7.
8.
9.
对因子von Neumann代数的套子代数上的保单位线性映射Φ:AlgMα→AlgMβ满足AB=ξBA(?)Φ(A)Φ(B)=ξΦ(B)Φ(A)进行了刻画,其中A,B∈AlgMα,ξ∈F,即证明了因子von Neumann代数的套子代数间每个保单位的弱连续线性满射它双边保因子交换性,则映射Φ或者是同构或者是反同构. 相似文献
10.
庞永锋王权魏银 《应用泛函分析学报》2020,(3):112-123
本文给出von Neumann代数上的(m,n)-三重导子的定义,并利用算子代数分解的方法证明了因子von Neumann代数上的(m,n)-三重导子是三重导子. 相似文献
11.
Ying Hu 《Journal of Functional Analysis》2008,254(5):1282-1306
We prove maximal ergodic inequalities for a sequence of operators and for their averages in the noncommutative Lp-space. We also obtain the corresponding individual ergodic theorems. Applying these results to actions of a free group on a von Neumann algebra, we get noncommutative analogues of maximal ergodic inequalities and pointwise ergodic theorems of Nevo-Stein. 相似文献
12.
关于强奇异极大交换子代数 总被引:1,自引:0,他引:1
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
13.
设α是可数离散群G和H的半直积G■_σH在冯·诺依曼代数M上的作用,则β_h=α_((e,h))AdU_h定义了群H在冯·诺依曼代数交叉积M■_αG上的作用β.本文证明了交叉积冯·诺依曼代数M■_α(G■_σH)与(M■_αG)■_βH是*-同构的,因此在一定条件下,冯·诺依曼代数的交叉积满足结合律. 相似文献
14.
Recently, E.C. Lance extended the pointwise ergodic theorem to actions of the group of integers on von Neumann algebras. Our purpose is to extend other pointwise ergodic theorems to von Neumann algebra context: the Dunford-Schwartz-Zygmund pointwise ergodic theorem, the pointwise ergodic theorem for connected amenable locally compact groups, the Wiener's local ergodic theorem for
+
d
and for general Lie groups. 相似文献
15.
Damien Gaboriau 《Journal of Functional Analysis》2011,260(2):414-427
We show that every non-amenable free product of groups admits free ergodic probability measure preserving actions which have relative property (T) in the sense of S. Popa (2006) [Pop06, Def. 4.1]. There are continuum many such actions up to orbit equivalence and von Neumann equivalence, and they may be chosen to be conjugate to any prescribed action when restricted to the free factors. We exhibit also, for every non-amenable free product of groups, free ergodic probability measure preserving actions whose associated equivalence relation has trivial outer automorphisms group. This gives, in particular, the first examples of such actions for the free group on 2 generators. 相似文献
16.
We investigate a construction (from Kodiyalam Vijay and Sunder V?S, J.?Funct. Anal. 260 (2011) 2635?C2673) which associates a finite von Neumann algebra M(??,??) to a finite weighted graph (??,??). Pleasantly, but not surprisingly, the von Neumann algebra associated to a ??flower with n petals?? is the group on Neumann algebra of the free group on n generators. In general, the algebra M(??,??) is a free product, with amalgamation over a finite-dimensional abelian subalgebra corresponding to the vertex set, of algebras associated to subgraphs ??with one edge?? (or actually a pair of dual edges). This also yields ??natural?? examples of (i) a Fock-type model of an operator with a free Poisson distribution; and (ii) ${\mathbb C} \oplus {\mathbb C}$ -valued circular and semi-circular operators. 相似文献
17.
Given a free ergodic action of a discrete abelian group G on a measure space (X, μ), the crossed product L
∞ (X, μ)⋊ G contains two distinguished maximal abelian subalgebras. We discuss what kind of information about the action can be extracted
from the positions of these two subalgebras inside the crossed product algebra.
Received February 24, 2002, Accepted August 5, 2002 相似文献
18.
Hansong Huang 《Integral Equations and Operator Theory》2009,64(3):381-398
This paper mainly concerns abelian von Neumann algebras generated by Toeplitz operators on weighted Bergman spaces. Recently
a family of abelian w*-closed Toeplitz algebras has been obtained (see [5,6,7,8]). We show that this algebra is maximal abelian and is singly generated
by a Toeplitz operator with a “common” symbol. A characterization for Toeplitz operators with radial symbols is obtained and
generalized to the high dimensional case. We give several examples for abelian von Neumann algebras in the case of high dimensional
weighted Bergman spaces, which are different from the one dimensional case. 相似文献
19.
Michel Enock 《Journal of Functional Analysis》1977,26(1):16-47
We introduce a notion of action of a Kac algebra (see [2, 9]) on a von Neumann algebra, and the cross-product of a von Neumann algebra by a Kac algebra with respect to an action α. The results of Takesaki [11, Chaps. 3 and 4] are then generalized, particularly the theorem of the double cross-product. 相似文献
20.
Robyn Curtis 《Comptes Rendus Mathematique》2002,334(1):31-35
We define the Hecke von Neumann algebra associated with a group G, a subgroup H and a unitary representation σ of H. We show that when σ is finite dimensional, can be seen as a corner algebra of the tensor product of the group von Neumann algebra of a locally compact group and a matrix algebra. To cite this article: R. Curtis, C. R. Acad. Sci. Paris, Ser. I 334 (2002) 31–35 相似文献