Riesz空间中的极大不相交系和表示理论

设Ｅ是阿基米德Ｒｉｅｓｚ空间，有弱单位元ｅ和极大不相交系｛ｅｉ：ｉ∈Ｉ｝，其中每一个ｅｉ都是投影元素．由ｅｉ生成的主带记为Ｂ（ｅｉ）．本文考虑如下论述：（ａ）存在完全正则Ｈａｕｓｄｏｒｆ空间Ｘ，使Ｅ是Ｒｉｅｓｚ同构于Ｃ（Ｘ）；（ｂ）对每一个ｉ∈Ｉ，存在一个完全正则Ｈａｕｓｄｏｒｆ空间Ｘｉ使Ｂ（ｅｉ）是Ｒｉｅｓｚ同构于Ｃ（Ｘｉ）．我们证明（ａ）可推出（ｂ）．但其逆在一般情况下不成立．当（ｂ）成立时，我们得到一些与（ａ）等价的论述．     

讲授Riesz表示定理的两点注记

对讲授Riesz表示定理提出了两点可供参考的资料和建议.     

一般化凸乘积空间上Fan-Browder型不动点定理和平衡点定理

我们得到了一般化凸乘积空间上 Fan- Browder型不动点定理 ,然后利用上述结果给出 (部分 )极大元素和平衡点的存在定理     

随机内积模上的Riesz表示定理及其应用

首先对完备随机内积模上的几乎处处有界的随机线性泛函建立了Riesz表示定理，该定理不仅表明每个完备随机内积模都是随机自共轭的而且也改进了文[1]的主要结果；然后，作为Riesz表示定理的应用，还证明了如下基本定理：设（Ω，σ，u）为任一概率空间，为任一不可分的Hilbert空间，那么任一弱随机元V：Ω→H必弱等价于某个强可测的随机元V：Ω→H     

乘积FC-空间内涉及——较好容许集值映象的优化映象族的极大元及其应用

引入了涉及-较好容许集值映象的映-拓扑空间到-有限连续拓扑空间（简称，FC-空间）的优化映象族．在乘积FC-空间的非紧设置下埘这类优化映象族证明了某些极大元存在性定理．在乘积FC-空间内给出了对不动点和极小极大不等式组的应用．这些定理改进、统一和推广了最近文献中的很多重要结果．     

乘积G-凸空间内的GB-优化映象的极大元及其应用(Ⅰ)

引入和研究了一类新的映拓扑空间到不同广义凸空间的集值映象簇·　利用连续单位分解定理和Brouwer不动点定理,在乘积广义凸空间的非紧设置下,对这类集值映象簇证明了极大元存在定理·　这些定理改进,统一和推广了近期文献中许多重要结果·     

乘积 G - 凸空间内的GB - 优化映象的极大元及其应用(Ⅱ)

通过应用G-凸空间的乘积空间内一族GB-优化映象的极大元的存在定理，在G-凸空间的非紧设置下证明了某些重合点定理，Fan-Browder型不动点定理和极小极大不等式组的解的存在性定理．这些定理改进和推广了献中许多重要的已知结果．     

乘积G-凸空间内的G_B-优化映象的极大元及其应用(Ⅱ)

通过应用G＿凸空间的乘积空间内一族GB＿优化映象的极大元的存在定理,在G＿凸空间的非紧设置下证明了某些重合点定理,Fan＿Browder型不动点定理和极小极大不等式组的解的存在性定理·　这些定理改进和推广了文献中许多重要的已知结果·     

一个空间和一个序空间乘积的正规性

本文讨论一个空间和一个特殊的序空间,即序数(其上带有序拓扑)乘积的正规性.所得到的结果中有些改进了已有的相应结果.例如下面的定理:定理 设 cf(α)>ω.若 t(X)相似文献   

侧完备Riesz空间中理想的直和及其表示定理

设{Ei：i∈I)是侧完备Riesz空间E中的一族理想，且Ei∩Ej=θ(i，j∈I，i≠j)．文章引入理想族{Ei：i∈I)直和的概念，并给出一个表示定理．文章证明了：存在一个完备的正则Hausdorff空间X使得理想族的直和Riesz同构于C(X)其充要条件是对每个i∈I存在一个紧Hausdorff空间Xi使得Ei Riesz同构于C(X)．     

Riesz product spaces and representation theory

Let {E _i:i∈I} be a family of Archimedean Riesz spaces. The Riesz product space is denoted by ∏ _i∈I E_i. The main result in this paper is the following conclusion: There exists a completely regular Hausdorff spaceX such that ∏ _i∈I E_i is Riesz isomorphic toC(X) if and only if for everyi∈I there exists a completely regular Hausdorff spaceX _i such thatE _i is Riesz isomorphic toC(X _i). Supported by the National Natural Science Foundation of China     

基本的局部实心Riesz空间

In this paper we focus ourselves on the positive cone of the locally solid Riesz spaces to characterize the fundamentality.From one example the article indicates that the fundamentality of the locally solid Riesz space is independent from the Lebesgue property.     

Pointfree Spectra of Riesz Spaces

One of the best ways of studying ordered algebraic structures is through their spectra. The three well-known spectra usually considered are the Brumfiel, Keimel, and the maximal spectra. The pointfree versions of these spectra were studied by B. Banaschewski for f-rings. Here, we give the pointfree versions of the Keimel and the maximal spectra for Riesz spaces. Moreover, we briefly mention how one can use the results of this paper to give a pointfree version of the Kakutani duality for Riesz spaces.     

关于B-凸空间及其上黎斯算子West分解

给出 Ｂａｎａｃｈ空间列｛Ｘｉ｝ｉ＝１∞的 ｌｐ乘积Ｂ－凸的特征刻划, 证明Ｂ－凸空间上的每个黎斯算子可Ｗｅｓｔ分解,即分解成一个紧算子和一个拟幂 零算子的和．     

Boundedness of Riesz Potentials in Nonhomogeneous Spaces

For a class of linear operators including Riesz potentials on R^d with a nonnegative Radon measure μ, which only satisfies some growth condition, the authors prove that their boundedness in Lebesgue spaces is equivalent to their boundedness in the Hardy space or certain weak type endpoint estimates, respectively. As an application, the authors obtain several new end estimates.     

Subspaces of Normed Riesz Spaces

It will be shown that a normed partially ordered vector space is linearly, norm, and order isomorphic to a subspace of a normed Riesz space if and only if its positive cone is closed and its norm p satisfies p(x)p(y) for all x and y with -yxy. A similar characterization of the subspaces of M-normed Riesz spaces is given. With aid of the first characterization, Krein's lemma on directedness of norm dual spaces can be directly derived from the result for normed Riesz spaces. Further properties of the norms ensuing from the characterization theorem are investigated. Also a generalization of the notion of Riesz norm is studied as an analogue of the r-norm from the theory of spaces of operators. Both classes of norms are used to extend results on spaces of operators between normed Riesz spaces to a setting with partially ordered vector spaces. Finally, a partial characterization of the subspaces of Riesz spaces with Riesz seminorms is given.     

紧致齐性空间上的调和分析（Ⅳ）─—Riesz变换与Bessel变换

本文研究了紧致齐性空间上的Ｒｉｅｓｚ位势算子与Ｂｅｓｓｅｌ位势算子，Ｒｉｅｓｚ变换与Ｂｅｓｓｅｌ变换，给出了上述算子对应的核函数的具体构造并证明了Ｒｉｅｓｚ变换与Ｂｅｓｓｅｌ变换作为奇异积分算子的Ｈ￣ｐ有界性，ｐ＞０。     

紧对称空间上Riesz平均的强逼近

本文在紧对称空间中给出了全测度集上Ｒｉｅｓｚ平均强逼近的阶     

Riesz Potentials in Besov and Triebel–Lizorkin Spaces over Spaces of Homogeneous Type

By using the discrete Calderón reproducing formulae, the author first establishes the boundedness of the Riesz-potential-type operator in homogeneous Besov and Triebel–Lizorkin spaces over spaces of homogeneous type. Then, by use of the T1 theorems for these spaces, the author proves that this operator of Riesz potential type can be used as the lifting operator of these spaces.