Compactness in L1 of a vector measure

被引：8

作者：

Calabuig, J. M. ^{[1
]}

Lajara, S. ^{[2
]}

Rodriguez, J. ^{[3
]}

Sanchez-Perez, E. A. ^{[1
]}

机构：

[1] Univ Politecn Valencia, Inst Univ Matemat Pura & Aplicada, E-46022 Valencia, Spain

[2] Univ Castilla La Mancha, Dept Matemat, Escuela Ingn Ind, Albacete 02071, Spain

[3] Univ Murcia, Fac Informat, Dept Matemat Aplicada, Espinardo 30100, Murcia, Spain

来源：

STUDIA MATHEMATICA | 2014年 / 225卷 / 03期

关键词：

vector measure; integration operator; compactness; angelic space; boundary; positive Schur property; completely continuous operator; almost Dunford-Pettis operator; strongly weakly compactly generated space; INTEGRATION OPERATORS; WEAK COMPACTNESS; IDEAL PROPERTIES; L-P; BANACH; SPACES; L(1);

D O I：

10.4064/sm225-3-6

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

We study compactness and related topological properties in the space L-1(m) of a Banach space valued measure m when the natural topologies associated to convergence of vector valued integrals are considered. The resulting topological spaces are shown to be angelic and the relationship of compactness and equi-Integrability is explored. A natural norming subset of the dual unit ball of L-1(m) appears in our discussion and we study when it is a boundary. The (almost) complete continuity of the integration operator is analyzed in relation with the positive Schur property of L-1(m). The strong weakly compact generation of L-1(m) is discussed as well.

引用

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页码：259 / 282

页数：24

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