三角代数上的Jordan-triple初等映射及Jordan同构

设U是三角代数,V为任意代数,证明了若映射M:U→V,M*:V→U为满射,并且满足Jordan-trip le初等映射的形式,则M,M*可加.并进一步讨论了映射M,M*在什么条件下具有Jordan同构形式.

Banach代数上的高阶Jordan-triple导子系的广义Hyers-Ulam-Rassias稳定性

针对Banach代数上的高阶Jordan-triple导子系,基于与函数方程有关的广义的Hyers-Ulam-Rassias稳定性的原理.采用线性算子论的方法,结合广义的Jensen等式,证明了Banach代数上与高阶导子系有关的函数方程具有广义的Hyers-Ulam-Rassias稳定性.证明结果表明该方法实用性强,操作简便,从而提供了一种利用稳定性研究扰动问题的方法.

对称算子空间上Jordan-triple初等映射的可加性

目的主要刻画对称算子空间上的2个映射M:J(H)→K(H)和M*:K(H)→J(H)是可加的,其中J(H)和K(H)分别表示H上的J-对称算子全体和K-对称算子全体。方法利用M和M*的性质以及对称算子分块的性质进行证明。结果与结论证明了若映射M:J(H)→K(H)和M*:K(H)→J(H)满足{M(AM*(B)C+CM*(B)A)=M(A)BM(C)+M(C)BM(A),M*(BM(A)D+DM(A)B)=M*(B)AM*(D)+M*(D)AM*(B)且M和M*是满射,则M和M*是可加的。

A Note on the Stability of Jordan Triple Higher Ring Derivations

In the present paper, we establish the stability and the superstability of a functional inequality corresponding to the functional equation fn（xyx） = ∑i＋j＋k=n fi（x）fj （y）fk（x）. In addition, we take account of the problem of Jacobson radical ranges for such functional inequality.

Jordan Triple Derivations on J-subspace Lattice Algebras

Let L be a J-subspace lattice on a Banach space X and Alg/2 the associated J-subspace lattice

Linear Maps Preserving Idempotency of Products of Matrices on Upper Triangular Matrix Algebras

Let Tn be the algebra of all n × n complex upper triangular matrices. We give the concrete forms of linear injective maps on Tn which preserve the nonzero idempotency of either products of two matrices or triple Jordan products of two matrices.