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Let E be a Banach function space over a finite and atomless measure space (Ω,Σ,μ) and let $(X, | | \cdot | |_{X})$ and $(Y, | | \cdot | |_{Y})$ be real Banach spaces. A linear operator T acting from the Köthe-Bochner space E(X) to Y is said to be absolutely continuous if $| | T (1_{A ₙ} f) {| |}_{Y} \to 0$ whenever μ(Aₙ) → 0, (Aₙ) ⊂ Σ. In this paper we examine absolutely continuous operators from E(X) to Y. Moreover, we establish relationships between different classes of linear operators from E(X) to Y.

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A bipolar theorem for L $_{+}^{0} (Ω, ℱ, 𝐏)$

A bornological approach to rotundity and smoothness applied to approximation.

A Characterization of Totally Reflexive Fréchet Spaces.

A Dini principle for convex functions and the theorem of James

A Duality Theorem for Locally Convex Tensor Products.

A Fréchet Space Which Has a Continuous Norm But Whose Bidual Does Not.

A general separation theorem for mappings, saddle-points duality and conjugate functions

A multiplicative functional on the commutative topological field

A Note on Minkowski Functionals of a Topological Vector Space

A Note on Surjections of Locally Convex Spaces.

A remark on regularly separated closed sets

A remark on Schwartz spaces consistent with a duality

A Remark on the Multidimensional Moment Problem.

A remark on the $π$ -reflexivity of Sova

A sequential analogue of the Grothendieck-Pták topology

Absolutely continuous linear operators on Köthe-Bochner spaces

Adjungiertenbildungen in der Operatortheorie.

An attempt of characterization of functions with sharp weakly complete epigraphs.

An extension theorem of functionals on commutative semigroups

Application of Duality Theory to spaces of Measures

Currently displaying 1 – 20 of 22