Every Weakly Compact Set Can Be Uniformly Embedded into a Reflexive Banach Space 被引量：8

Every Weakly Compact Set Can Be Uniformly Embedded into a Reflexive Banach Space

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摘要 Based on an application of the Davis-Figiel-Johnson-Pelzyski procedure, this note shows that every weakly compact subset of a Banach space can be uniformly embedded into a reflexive Banach space. As its application, we present the recent renorming theorems for reflexive spaces of Odell- Schlumprecht and Hajek-Johanis can be extended and localized to weakly compact convex subsets of an arbitrary Banach space. Based on an application of the Davis-Figiel-Johnson-Pelzyski procedure, this note shows that every weakly compact subset of a Banach space can be uniformly embedded into a reflexive Banach space. As its application, we present the recent renorming theorems for reflexive spaces of Odell- Schlumprecht and Hajek-Johanis can be extended and localized to weakly compact convex subsets of an arbitrary Banach space.

作者 Li Xin CHENG Qing Jin CHENG Zheng Hua LUO Wen ZHANG

机构地区 Department of Mathematics

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2009年第7期1109-1112,共4页 数学学报（英文版）

基金 Supported by NSFC Grant No. 10771175

关键词 Banach space weakly compact set RENORMING Banach space, weakly compact set, renorming

分类号 O177.91 [理学—基础数学] O177.3 [理学—基础数学]

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参考文献1

1Li Xin CHENG,Yan Mei TENG.Certain Subsets on Which Every Bounded Convex Function Is Continuous[J].Acta Mathematica Sinica,English Series,2007,23(6):1063-1066. 被引量：2

二级参考文献7

1Ger, R., Kuczma, M.: On the boundedness of convex functions and additive functions. Aequat. Math., 4, 157-162 (1970).
2Jablonski, W.: On a class of sets connected with a convex function. Abh. Math. Sem. Univ. Hamburg, 69, 205-210 (1999).
3Rockafellar, R. T.: Convex Analysis, Princeton Univ. Press, 1970.
4Holmes, R.: Geometric Functional Analysis and its Applications, Springer-Verlag, 1975.
5Phelps, R. R.: Convex functions, monotone operators, and differentiability, Lect. Notes in Math., 1364, Springer-Verlag, 1989.
6BrΦndsted, A.: An Introduction to convex Polytopes, Springer-Verlag, 1983.
7Wu, C. X, Cheng, L. X.: A note on differentiability of convex functions. Proc. Amer. Math. Soc., 121, 1057-1062 (1994).

共引文献1

1Qing Jin CHENG,Bo WANG,Cui Ling WANG.On Uniform Convexity of Banach Spaces[J].Acta Mathematica Sinica,English Series,2011,27(3):587-594. 被引量：2

同被引文献5

1CHENXIAOMAN,WANGQIN.IDEAL STRUCTURE OF UNIFORM ROE ALGEBRAS OVER SIMPLE CORES[J].Chinese Annals of Mathematics,Series B,2004,25(2):225-232. 被引量：3
2Li Xin CHENG,Yan Mei TENG.Certain Subsets on Which Every Bounded Convex Function Is Continuous[J].Acta Mathematica Sinica,English Series,2007,23(6):1063-1066. 被引量：2
3罗正华.关于2R(w2R)范数的一个注记[J].数学研究,2010,43(4):387-392. 被引量：1
4周巍,罗正华.弱紧集的一个新特征[J].厦门大学学报（自然科学版）,2013,52(3):309-311. 被引量：2
5Cheng Lixin,Wu Congxin,Xue Xiaoping,Yao Xiaobo Nankai Institute of Mathematics, Nankai University, Tianjin 300071, China Department of Mathematics, Harbin Institute of Technology, Harbin 150006, China.Convex Functions, Subdifferentiability and Renormings[J].Acta Mathematica Sinica,English Series,1998,14(1):47-56. 被引量：3

引证文献8

1罗正华.关于2R(w2R)范数的一个注记[J].数学研究,2010,43(4):387-392. 被引量：1
2程立新,程庆进.度量空间的嵌入问题[J].厦门大学学报（自然科学版）,2011,50(2):187-192.
3Qing Jin CHENG,Bo WANG,Cui Ling WANG.On Uniform Convexity of Banach Spaces[J].Acta Mathematica Sinica,English Series,2011,27(3):587-594. 被引量：2
4罗正华.弱紧集上的2-Rotund范数[J].华侨大学学报（自然科学版）,2012,33(3):357-360.
5罗正华,孙龙发.弱紧集与可逼近集的和[J].厦门大学学报（自然科学版）,2013,52(2):157-159. 被引量：2
6周巍,罗正华.弱紧集的一个新特征[J].厦门大学学报（自然科学版）,2013,52(3):309-311. 被引量：2
7罗正华,周巍,陈丽珍.关于可逼近性和弱紧性的一个注记[J].厦门大学学报（自然科学版）,2014,53(4):604-606.
8Zhi Tao YANG,Yu Feng LU,Qing Jin CHENG.Super Weak Compactness and Uniform Eberlein Compacta[J].Acta Mathematica Sinica,English Series,2017,33(4):545-553. 被引量：1

二级引证文献8

1罗正华.弱紧集上的2-Rotund范数[J].华侨大学学报（自然科学版）,2012,33(3):357-360.
2孙龙发,罗正华.强可逼近集的和[J].厦门大学学报（自然科学版）,2013,52(3):312-315.
3罗正华,周巍,陈丽珍.关于可逼近性和弱紧性的一个注记[J].厦门大学学报（自然科学版）,2014,53(4):604-606.
4钟国翔.自反Banach空间的弱紧性[J].闽南师范大学学报（自然科学版）,2016,29(4):1-4.
5孟庆丰,罗正华,施慧华.关于联合可逼近子空间和的一个注记[J].厦门大学学报（自然科学版）,2017,56(4):551-554.
6程庆进.Banach空间中的超弱紧集[J].中国科学：数学,2020,50(12):1695-1720. 被引量：1
7Li Xin CHENG,Qing Jin CHENG,Jian Jian WANG.On Absolute Uniform Retracts, Uniform Approximation Property and Super Weakly Compact Sets of Banach Spaces[J].Acta Mathematica Sinica,English Series,2021,37(5):731-739. 被引量：1
8崔云安,代明君.赋Luxemburg范数的Orlicz序列空间的次接近一致凸性[J].哈尔滨理工大学学报,2022,27(2):149-153.

1沈文选.戴维斯定理及应用[J].中等数学,2014(2):2-5. 被引量：1
2丁协平.ALGORITHM OF SOLUTIONS FOR MIXEDNONLINEAR VARIATIONAL-LIKE INEQUALITIES IN REFLEXIVE BANACH SPACE[J].Applied Mathematics and Mechanics(English Edition),1998,19(6):521-529.
3韩龙,石磊,米切尔.沃德罗普.物理学破解癌症难题[J].世界科学,2011(8):36-38.
4魏薇,金锐.宇宙中的隐形人[J].大科技（科学之谜）（A）,2002(12):4-5.
5王以超.雷蒙德·戴维斯[J].财经,2006,0(12):138-138.
6SONG Wen(Department of Mathematics, Harbin Normal University, Harbin 150080, China).APPROXIMATION OF SOLUTION OF RELAXED DIFFERENTIAL INCLUSION ON COMPACT SET[J].Systems Science and Mathematical Sciences,1996,9(4):289-294.
7陈世平.精算数学中的鞅方法[J].数学理论与应用,2003,23(3):12-17. 被引量：1
8时间机器：科学家的梦幻[J].奇闻怪事,2014,0(12):32-33.
9CAO Jun YANGDaChun.Hardy spaces H_L^p(R^n) associated with operators satisfying k-Davies-Gaffney estimates[J].Science China Mathematics,2012,55(7):1403-1440. 被引量：13
10陈明,仇庆久.The Holderian solution and its singularity propagation for a class of system of quasi-linear partial differential equations[J].Chinese Science Bulletin,1995,40(10):797-801.

Acta Mathematica Sinica,English Series

2009年第7期

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