6533b82efe1ef96bd1293ddd

RESEARCH PRODUCT

On set-valued cone absolutely summing maps

Valeria MarraffaCoenraad C.a. Labuschagne

subject

Discrete mathematicsGeneral MathematicsBanach spaceBochner spaceSpace (mathematics)Measure (mathematics)Separable spaceCombinatoricsBanach lattice Bochner space Cone absolutely summing operator Integrably bounded set-valued function Set-valued operatorNumber theoryCone (topology)Settore MAT/05 - Analisi MatematicaBounded functionMathematics

description

Spaces of cone absolutely summing maps are generalizations of Bochner spaces Lp(μ, Y), where (Ω, Σ, μ) is some measure space, 1 ≤ p ≤ ∞ and Y is a Banach space. The Hiai-Umegaki space \( \mathcal{L}^1 \left[ {\sum ,cbf(X)} \right] \) of integrably bounded functions F: Ω → cbf(X), where the latter denotes the set of all convex bounded closed subsets of a separable Banach space X, is a set-valued analogue of L1(μ, X). The aim of this work is to introduce set-valued cone absolutely summing maps as a generalization of \( \mathcal{L}^1 \left[ {\sum ,cbf(X)} \right] \) , and to derive necessary and sufficient conditions for a set-valued map to be such a set-valued cone absolutely summing map. We also describe these set-valued cone absolutely summing maps as those that map order-Pettis integrable functions to integrably bounded set-valued functions.

yearjournalcountryeditionlanguage
2009-12-16Central European Journal of Mathematics
https://doi.org/10.2478/s11533-009-0059-7