A note on the range of vector measures
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Niccolò Urbinati
und
Hans Weber
Abstract
We give another proof for Kluvanek and Knowles’ characterization of Liapounoff measures [KLUVANEK, I.—KNOWLES, G.: Vector Measures and Control Systems. North-Holland Mathematics Studies 20, Amsterdam, 1976] and of the fact that the range of an exhaustive measure with values in a complete locally convex space is relatively weakly compact.
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© 2017 Mathematical Institute Slovak Academy of Sciences
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- Paolo de Lucia
- Arcs, hypercubes, and graphs as quotients of projective Fraïssé limits
- A note on field-valued measures
- Topologies and uniformities on d0-algebras
- On some properties of 𝓙-approximately continuous functions
- Porous subsets in the space of functions having the Baire property
- Rademacher’s theorem in Banach spaces without RNP
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- The Choquet integral with respect to fuzzy measures and applications
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- Ideal convergent subsequences and rearrangements for divergent sequences of functions
- Convergence results for a family of Kantorovich max-product neural network operators in a multivariate setting
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- Monotonicity and total boundedness in spaces of “measurable” functions
- Vector lattices in synaptic algebras
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