共查询到19条相似文献,搜索用时 140 毫秒
1.
局部凸空间中的可微性定理和扰动优化或变分原理(英文) 总被引:2,自引:0,他引:2
程立新 《应用泛函分析学报》1999,(3)
通过对局部凸空间上凸函数可微性的讨论,首先建立了关于凸函数β可微性的特征定理;定义在局部凸空间E的非空开凸子集D上的每个连续凸函数f均在D的一个稠密的子集上β-可微(也称E具有β-LP性质)的充分必要条件为其对偶E“中的每个w~*紧凸子集均是自己w~*一β暴露点的w~* 闭凸包;然后进一步证明了E~*上的w~*一β扰动优化定理成立,即定义在E~*的每个有界w~*闭集A~*上的w 下半连续有下界的函数g以及每个ε >0均存在x0 A及x E满足使得(g+x)(x )=infA (g+x)且{xi } A ,(g+x)(xi )→infA (g+x)推出 xi -xo ,当且仅当 E具有β-LP性质. 相似文献
2.
在具Frechet可微范数的一致凸Banach空间中,给出了渐近非扩张拓扑半群的遍历压缩定理 相似文献
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我们称定义在一个Banach空间的对偶空间上的广义实值w*-下半连续凸函数f具有w*-Frechet可微性质(w*-FDP),如果对于该对偶空间上的每个w*-下半连续的广义实值凸函数g,只要g≤f,就有g在intdom g的某个稠密的Gδ-子集上处处Frechet可微.本文用集合的Radon-Nikodym性质刻划了该种函数的特征.作为它的一个直接推论,给出了局部化的Collier定理. 相似文献
4.
我们称定义在一个Banach空间的对偶空间上的广义实值w*-下半连续凸函数f具有w*-Frechet可微性质(w*-FDP),如果对于该对偶空间上的每个w*-下半连续的广义实值凸函数g,只要g≤f,就有g在intdom g的某个稠密的Gδ-子集上处处Frechet可微.本文用集合的Radon-Nikodym性质刻划了该种函数的特征.作为它的一个直接推论,给出了局部化的Collier定理. 相似文献
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6.
Banach空间中非Lipschitzian交换非线性拓扑半群的遍历理论 总被引:3,自引:0,他引:3
本文在满足opial条件或存在Frechet可微范数的一致凸Banach空间中,给出了非Lipschitzian交换拓扑半群的遍历收敛定理及弱收敛定理. 相似文献
7.
设Banach空间E具有等价二次严格凸范数, f为其对偶空间E^*上的w^*下半连续Lipschitz凸函数, 该文证明了E^*上存在w^*下半连续且很光滑点集稠密(从而在稠子集上Gateaux可微)的Lipschitz 凸函数的单调序列{f_n}在有界集上一致逼近f. 相似文献
8.
w*-Fréchet可微性质和Radon-Nikodym性质以及w*-Asplund空间 总被引:1,自引:0,他引:1
我们称定义在一个Banach空间的对偶空间上的广义实值w*-下半连续凸函数f具有w*-Fréchet可微性质(w*-FDP),如果对于该对偶空间上的每个w*-下半连续的广义实值凸函数g,只要g≤f,就有g在intdom g的某个稠密的Gδ-子集上处处Fréchet可微.本文用集合的Radon-Nikodym性质刻划了该种函数的特征.作为它的一个直接推论,给出了局部化的Collier定理. 相似文献
9.
本文继续近年来关于局部有界空间的讨论,提出了更一般的赋(p,k)范空间的概念,得到了分离的局部有界空间的一个新特征:可再赋(p,k)范数.进而,将文[3]的结果推广到线性拓扑空间中,证明了一类赋 p-范空间,存在 k 拟次可加.β级绝对齐性非零连续泛函的充要条件是:k≥2~(p/p-1). 相似文献
10.
卜庆营 《纯粹数学与应用数学》1997,13(1):47-49
A.Pietsch^[1]在讨论核局部凸空间时给出了两类矢值序列空间l1[X]和l1{X}。本文建立了矢值序列空间l1[X]及l1{X}和连续线性算子空间L(c0,X)及绝对可和算子空间AS(c0,X)之间的拓扑同胚关系。通过c0上的矢值算子类L(c0,X)和AS(c0,X)及其上的拓扑等价关系,对局部凸空间X是核空间给出了一个新的特征刻划。 相似文献
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A locally convex space is said to be a Gateaux differentiability space (GDS)provided every continuous convex function defined on a nonempty convex open subset D of the space is densely Gateaux differentiable in D.This paper shows that the product of a GDS and a family of separable Frechet spaces is a GDS,and that the product of a GDS and an arbitrary locally convex space endowed with the weak topology is a GDS. 相似文献
12.
This paper through discussing subdifferentiability and convexity of convex functions shows that a Banach space admits an equivalent
uniformly [locally uniformly, strictly] convex norm if and only if there exists a continuous uniformly [locally uniformly,
strictly] convex function on some nonempty open convex subset of the space and presents some characterizations of super-reflexive
Banach spaces.
Supported by NSFC 相似文献
13.
Jing Hui QIU 《数学学报(英文版)》2007,23(12):2295-2302
In the framework of topological vector spaces, we give a characterization of strong Minkowski separation, introduced by Cheng, et al., in terms of convex body separation. From this, several results on strong Minkowski separation are deduced. Using the results, we prove a drop theorem involving weakly countably compact sets in locally convex spaces. Moreover, we introduce the notion of the co-drop property and show that every weakly countably compact set has the co-drop property. If the underlying locally convex space is quasi-complete, then a bounded weakly closed set has the co-drop property if and only if it is weakly countably compact. 相似文献
14.
Xi Yin Zheng 《Set-Valued Analysis》2005,13(2):181-196
We introduce and discuss measure of non-Radon–Nikodym property to investigate differentiability of continuous convex functions on Banach spaces. Using this new concept, we establish some results about Asplund spaces and generic Fréchet differentiability of continuous convex functions on non-Asplund spaces.Mathematics Subject Classifications (2000) 46B22, 49J50, 49J53. 相似文献
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DIFFERENTIABILITYOFCONVEXFUNCTIONSANDASPLUNDSPACESChengLizin(程立新)ZhangFeng(张风)(Math.Section,Dept.ofPublicCourses,JianghanrPet... 相似文献
16.
A locally convex space is said to be a Gateaux differentiability space (GDS) provided every continuous convex function defined on a nonempty convex open subset D of the space is densely Gateaux differentiable in .D.This paper shows that the product of a GDS and a family of separable Prechet spaces is a GDS,and that the product of a GDS and an arbitrary locally convex space endowed with the weak topology is a GDS. 相似文献
17.
DIFFERENTIABILITY OF CONVEX FUNCTIONS ON SUBLINEAR TOPOLOGICAL SPACES AND VARIATIONAL PRINCIPLES IN LOCALLY CONVEX SPACES 总被引:1,自引:0,他引:1
This paper presents a type of variational principles for real valued w lower semicon-tinuous functions on certain subsets in duals of locally convex spaces, and resolve a problem concerning differentiability of convex functions on general Banach spaces. They are done through discussing differentiability of convex functions on nonlinear topological spaces and convexification of nonconvex functions on topological linear spaces. 相似文献
18.
《数学物理学报(B辑英文版)》2005,25(3):395-400
A locally convex space is said to be a Gâteaux differentiability space (GDS) provided every continuous convex function defined on a nonempty convex open subset D of the space is densely Gâteaux differentiable in D. This paper shows that the product of a GDS and a family of separable Fréchet spaces is a GDS, and that the product of a GDS and an arbitrary locally convex space endowed with the weak topology is a GDS. 相似文献
19.
本文对赋序列范数的矢值Banach序列空间ss(E)的一些凸性进行了讨论,得到的主要结果如下: 1.ss(E)是局部一致凸的当且仅当ss和E是局部一致凸的; 2.ss(E)是强凸的当且仅当ss和E是强凸的; 3.设ss和ss*具有AK性质,则ss(E)是非常凸的当且仅当ss和E是非常凸的. 相似文献