子空间格代数上的局部Lie导子

引入了局部Lie导子的概念,研究了AlgL上的局部Lie导子,其中L是Banach空间X上的子空间格且X≠X_,得到了关于AlgL上局部Lie导子的两个重要结论.     

J-子空间格代数上中心化子和广义导子的刻画

设L是Banach空间X上的J-子空间格,AlgL是相应的(J-子空间格代数.设φ:AlgL→AlgL是可加映射,对每个K∈(J)(L),dimK≥2.该文证明了下列表述等价:(1)φ是中心化子;(2)φ满足AB=0■φ(A)B=Aφ(B)=0;(3)φ满足AB+BA=0■φ(A)B+φ(B)A=Aφ(B)+Bφ(A)=0;(4)φ满足ABC+CBA=0■φ(A)BC+φ(C)BA=ABφ(C)+CBφ(A)=0.作为应用,得到AlgL上在零点广义可导的可加映射的完全刻画.     

因子von Neumann代数上导子的等价刻画

设R是含非平凡幂等元P的素环,C∈R,C=PC.本文证明可加映射△:R→R在C可导,即△(AB)=△(A)B+A△(B),A,B∈R,AB=C当且仅当存在导子δ:R→R,使得△(A)=δ(A)+△(I)A,A∈R.没有I_1型中心直和项的von Neumann代数上的可导映射也有类似结论.利用该结论证明了,若非零算子C∈B(X),使得ran(C)或ker(C)在X中可补,则可加映射△:B(X)→B(X)在C可导当且仅当它是导子.特别地,证明了因子von Neumann代数上的可加映射在任意但固定的非零算子可导当且仅当它是导子.     

三角代数上Lie三重导子的刻画

设u=Tri(A,M,B)是三角代数.证明了在一般的假设下,如果线性映射δ:u→u,满足对任意的U,V,W∈u且UV=UW=0(或U·V=U·W=0),有δ([[U,V],W])=[[δ(U),V],W]+[[U,δ(V)],W]+[[U,V],δ(W)],则对任意U∈u,δ(U)=φ(U)+h(U),其中φ:u→u是一个导子,线性映射h:u→Z(u),满足对任意的U,V,W∈u且UV=UW=0(或U·V=U·W=0),有h([[U,V],W])=0.     

算子代数上(m,n)-Jordan导子的刻画

设R是一个环,M是一个R-双边模,m和n是两个非负整数满足m+n≠0,如果δ是一个从R到M的可加映射满足对任意A∈R,(m+n)δ(A~2)=2mAδ(A)+2nδ(A)A,则称δ是一个(m,n)-Jordan导子.本文证明了,如果R是一个单位环,M是一个单位R-双边模含有一个由R中幂等元代数生成的左(右)分离集,那么,当m,n0且m≠n时,每一个从R到M的(m,n)-Jordan导子恒等于零.还证明了,如果A和B是两个单位环,M是一个忠实的单位(A,B)-双边模(N是一个忠实的单位(B,A)-双边模),m,n0且m≠n,U=[A N M B]是一个|mn(m-n)(m+n)|-无挠的广义矩阵环,那么每一个从U到自身的(m,n)-Jordan导子恒等于零.     

完全分配CSL代数上的中心化子

设L是可分Hilbert空间上的完全分配交换子空间格,A是Alg L的子代数并且包含Alg L的全体有限秩算子.主要结果是:(1)A上的中心化子是拟空间的;(2)Alg L上的Jordan中心化子是中心化子;(3)当L是套时,Alg L上的Lie中心化子可表示成一个中心化子与一个可加泛函之和的形式,该泛函作用在形如AB-BA的算子上为零.     

Jordan Derivations of Reflexive Algebras

Let ${\mathcal L}Let L{\mathcal L} be a subspace lattice on a Banach space X and suppose that ú{L ? L: L_- < X}=X{\vee\{L\in\mathcal L: L_- < X\}=X} or ${\land\{L_- : L \in \mathcal L, L>(0)\}=(0)}${\land\{L_- : L \in \mathcal L, L>(0)\}=(0)} . Then each Jordan derivation from AlgL{\mathcal L} into B(X) is a derivation. This result can apply to completely distributive subspace lattice algebras, J{\mathcal J} -subspace lattice algebras and reflexive algebras with the non-trivial largest or smallest invariant subspace.     

三角代数上的一类非全局三重可导映射

设?=Tri(A,M,B)为三角代数,?={T∈?:T~2=0}且δ:?→?是一个映射(没有可加或线性假设).证明了:如果对任意A,B,C∈?且ABC∈?,有δ(ABC)=δ(A)BC+Aδ(B)C+ABδ(C),则δ是一个可加导子·作为应用,得到了上三角矩阵代数和套代数上此类非全局三重可导映射的具体形式.     

Local derivations and local automorphisms

In this paper, we show that if is a completely distributive commutative subspace lattice or a -subspace lattice, then the space of all bounded derivations of is reflexive. We also study when local automorphisms on some algebras are automorphisms.     

自反代数上的局部Lie $n$-导子

令$\mathcal{L}$是一个满足$X_{-} \neq X$和$(0)_{+} \neq(0)$的Banach空间$X$上的子空间格.我们证明了从${\rm Alg}\,L$映到$B(X)$中的每个局部Lie $n$-导子是一个Lie $n$-导子.     

On derivable mappings

A linear mapping δ from an algebra A into an A-bimodule M is called derivable at c∈A if δ(a)b+aδ(b)=δ(c) for all a,b∈A with ab=c. For a norm-closed unital subalgebra A of operators on a Banach space X, we show that if C∈A has a right inverse in B(X) and the linear span of the range of rank-one operators in A is dense in X then the only derivable mappings at C from A into B(X) are derivations; in particular the result holds for all completely distributive subspace lattice algebras, J-subspace lattice algebras, and norm-closed unital standard algebras of B(X). As an application, every Jordan derivation from such an algebra into B(X) is a derivation. For a large class of reflexive algebras A on a Banach space X, we show that inner derivations from A into B(X) can be characterized by boundedness and derivability at any fixed C∈A, provided C has a right inverse in B(X). We also show that if A is a canonical subalgebra of an AF C^∗-algebra B and M is a unital Banach A-bimodule, then every bounded local derivation from A into M is a derivation; moreover, every bounded linear mapping from A into B that is derivable at the unit I is a derivation.     

Characterizations of ( m,n )-Jordan Derivations and ( m,n )-Jordan Derivable Mappings on Some Algebras

Let R be a ring, M be a R-bimodule and m, n be two fixed nonnegative integers with m + n = 0. An additive mapping δ from R into M is called an(m, n)-Jordan derivation if(m +n)δ(A~2) = 2 mAδ(A) + 2nδ(A)A for every A in R. In this paper, we prove that every(m, n)-Jordan derivation with m = n from a C*-algebra into its Banach bimodule is zero. An additive mappingδ from R into M is called a(m, n)-Jordan derivable mapping at W in R if(m + n)δ(AB + BA) =2mδ(A)B + 2 mδ(B)A + 2 nAδ(B) + 2 nBδ(A) for each A and B in R with AB = BA = W. We prove that if M is a unital A-bimodule with a left(right) separating set generated algebraically by all idempotents in A, then every(m, n)-Jordan derivable mapping at zero from A into M is identical with zero. We also show that if A and B are two unital algebras, M is a faithful unital(A, B)-bimodule and U = [A M N B] is a generalized matrix algebra, then every(m, n)-Jordan derivable mapping at zero from U into itself is equal to zero.     

套代数的直和分解

本文主要研究套代数的直和分解。刻划了满足条件的交换子空间格Ｌ的结构，其中Ｒ是套代数的某一特殊子空间；得到了套代数分解成对角代数与某些特殊理想（例如：Ｊａｃｏｂｓｏｎ根或者Ｌａｒｓｏｎ理想）的直和的充要条件，同时也刻划了的一个范数闭左理想上Ｊ＿Ｎ最后，研究了对角代数与某些超因果理想直和的结构。     

某些算子代数的可加导子

本文主要研究非Ｉｎ型因子ＶｏｎＮｅｕｍａｎｎ代数的Ｎｅｓｔ子代数及两元生成格自反代数的可加导子的自动线性性和连续性问题．通过给出一个含无限维交换ＶｏｎＮｅｕｍａｎｎ子代数的代数上可加导子定理，证明了非Ｉｎ型因子ＶｏｎＮｅｕｍａｎｎ代数的Ｎｅｓｔ子代数上的可加导子是线性的，从而是自动连续的．这推广并简化证明了作者［１］中的主要结果．对于在非自伴算子代数研究中起重要的两元生成格自反代数，给出了所有可加导子是线性导子的充分必要条件．     

Nonlinear skew lie triple derivations between factors

Let A be a factor.For A,B∈A,define by [A,B]_*=AB-BA~* the skew Lie product of A and B.In this article,it is proved that a map Φ:A→A satisfies Φ([[A,B]_*,C]_*)=[[Φ(A),B]_*,C]_w+[[A,Φ(B)]_*,C]_*+[[A,B]_*,Φ(C)]_* for all A,B,C∈A if and only if Φ is an additive *-derivation.     

三角代数上Jordan高阶导子的刻画

设u=Tri(A,M,B)是含单位元I的三角代数,()={()_n}_(n∈N)是u上一簇线性映射.本文证明了:如果对任意U,V∈u且UV=VU=I,有()_n(UV+VU)=∑_(i+j=n)(()_i(U)_(()_j)(V)+()_i(V)()_j(U)),则()={()_n}_(n∈N)是u上高阶导子.作为应用,得到了套代数上Jordan高阶导子的一个刻画.     

自反子空间格的表示和运算

证明了von Neumann 代数的子空间格的自反性和KS- 性都不依赖于该von Neumann 代数的正规忠实*- 表示; 引入了von Neumann 代数及所含子空间格的半自由积运算, 证明了两子空间格的半自由积同构于它们的直和.     

算子代数上2-局部Lie三重导子的结构

设X是维数大于2的Banach空间,映射δ:B(X)→B(X)是2-局部Lie三重导子,则对所有A∈B(X)有δ(A)=[A,T]+φ(A),这里T∈B(X),φ是从B(X)到FI的齐次映射且满足对所有A,B∈B(X)有φ(A+B)=φ(A),其中B是交换子的和.     

Lie derivations of -subspace lattice algebras

We describe the structure of Lie derivations of -subspace lattice algebras. The results can apply to atomic Boolean subspace lattice algebras and pentagon subspace lattice algebras, respectively.

     

Nest代数的Jacobson根的μ-核值保持映射

设算子代数Ａ　Ｂ（Ｈ），μ（Ａ）表示Ａ中的部分等距算子全体，若ｐ是Ａ到Ｂ（Ｈ）的线性映射，且对任意的ＵＥｕ（Ａ），有叫Ｕ）（ｋｅｃＵ）Ｇｒ“ｈＣｒ，则称　是Ａ上的μ－核值保持映射。本文将证明：Ｎｅｓｔ代数的Ｊａｃｏｂｓｏｎ根上的范数拓扑连续的μ－核值保持映射是广义内导子。