Ioana Ghenciu, Paul Lewis (2006)
Colloquium Mathematicae
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The Dunford-Pettis property and the Gelfand-Phillips property are studied in the context of spaces of operators. The idea of L-sets is used to give a dual characterization of the Dunford-Pettis property.
Ondřej F. K. Kalenda, Jiří Spurný (2012)
Studia Mathematica
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We prove in particular that Banach spaces of the form C₀(Ω), where Ω is a locally compact space, enjoy a quantitative version of the reciprocal Dunford-Pettis property.
Kirill Naralenkov (2010)
Czechoslovak Mathematical Journal
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In this paper two Denjoy type extensions of the Pettis integral are defined and studied. These integrals are shown to extend the Pettis integral in a natural way analogous to that in which the Denjoy integrals extend the Lebesgue integral for real-valued functions. The connection between some Denjoy type extensions of the Pettis integral is examined.
Fernando Bombal Gordon (1987)
Extracta Mathematicae
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Ye, Guoju, An, Tianqing (2001)
International Journal of Mathematics and Mathematical Sciences
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Ioana Ghenciu, Paul Lewis (2006)
Bulletin of the Polish Academy of Sciences. Mathematics
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Dunford-Pettis type properties are studied in individual Banach spaces as well as in spaces of operators. Bibasic sequences are used to characterize Banach spaces which fail to have the Dunford-Pettis property. The question of whether a space of operators has a Dunford-Pettis property when the dual of the domain and the codomain have the respective property is studied. The notion of an almost weakly compact operator plays a consistent and important role in this study.
S. Simons (1975)
Mathematische Annalen
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José Mendoza, P. Cembranos, F. Bombal (1990)
Mathematische Zeitschrift
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José Gámez, José Mendoza (1998)
Studia Mathematica
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The two main results of this paper are the following: (a) If X is a Banach space and f : [a,b] → X is a function such that x*f is Denjoy integrable for all x* ∈ X*, then f is Denjoy-Dunford integrable, and (b) There exists a Dunford integrable function which is not Pettis integrable on any subinterval in [a,b], while belongs to for every subinterval J in [a,b]. These results provide answers to two open problems left by R. A. Gordon in [4]. Some other questions in connection with...
N. D. Chakraborty, Sk. Jaker Ali (1993)
Revista Matemática de la Universidad Complutense de Madrid
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Some characterizations have been given for the relative compactness of the range of the indefinite Pettis integral of a function on a complete finite measure space with values in a quasicomplete Hausdorff locally convex space. It has been shown that the indefinite Pettis integral has a relatively compact range if the functions is measurable by seminorm. Separation property has been defined for a scalarly measurable function and it has been proved that a function with this property is...
Charles Swartz (1973)
Colloquium Mathematicae
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Bombal, Fernando (1988)
Portugaliae mathematica
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G. Schlüchtermann (1992)
Mathematische Annalen
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