Fernando Mayoral scite author profile

Let (Ω, Σ) be a measurable space and m : Σ → X be a vector measure with values in the complex Banach space X. We apply the Calderón interpolation methods to the family of spaces of scalar p−integrable functions with respect to m with 1 ≤ p ≤ ∞. Moreover we obtain a result about the relation between the complex interpolation spaces[θ] for a Banach couple of interpolation (X 0 , X 1 ) such that X 1 ⊂ X 0 with continuous inclusion.

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Spaces of Vector‐Valued Integrable Functions and Localization of Bounded Subsets

Florencio¹,

Mayoral²,

Paúl³

1995

Mathematische Nachrichten

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We study the structure of bounded sets in the space L ' ( E } of absolutely integrable Lusin-measurable functions with values in a locally convex space E. The main idea is to extend the notion of property (B) of Pietsch, defined within the context of vector-valued sequences, to spaces of vector-valued functions. We prove that this extension, that at first sight looks more restrictive, coincides with the original property ( B ) for quasicomplete spaces. Then we show that when dealing with a locally convex space, property (B) provides the link to prove the equivalence between Radon-Nikodym property (the existence of a density function for certain vector measures) and the integral representation of continuous linear operators T:L' -. E, a fact well-known for Banach spaces. We also study the relationship between Radon-Nikodym property and the characterization of the dual of L'{E} as the space LODIE;}.

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The de la Vallée-Poussin theorem and Orlicz spaces associated to a vector measure

Campo

Fernández

Mayoral

et al. 2019

Journal of Mathematical Analysis and Applications

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