The duality of convex functions and Cesari's property Q
Gerald Goodman (1976)
Banach Center Publications
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Displaying similar documents to “Convex transformations with Banach lattice range.”
The duality of convex functions and Cesari's property Q
The cancellation law for inf-convolution of convex functions
Dariusz Zagrodny (1994)
Studia Mathematica
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Conditions under which the inf-convolution of f and g has the cancellation property (i.e. f □ h ≡ g □ h implies f ≡ g) are treated in a convex analysis framework. In particular, we show that the set of strictly convex lower semicontinuous functions on a reflexive Banach space such that constitutes a semigroup, with inf-convolution as multiplication, which can be embedded in the group of its quotients.
On the level sum of two convex functions on Banach spaces.
Traoré, S., Volle, M. (1996)
Journal of Convex Analysis
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Continuity properties of convex-type set-valued maps.
Nikodem, Kazimierz (2003)
JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]
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Minimal convex-valued weak USCO correspondences and the Radon-Nikodým property
Luděk Jokl (1987)
Commentationes Mathematicae Universitatis Carolinae
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A characterization of midconvex set-valued functions
Kazimierz Nikodem (1989)
Acta Universitatis Carolinae. Mathematica et Physica
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On Bárány's theorems of Carathéodory and Helly type
Ehrhard Behrends (2000)
Studia Mathematica
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The paper begins with a self-contained and short development of Bárány’s theorems of Carathéodory and Helly type in finite-dimensional spaces together with some new variants. In the second half the possible generalizations of these results to arbitrary Banach spaces are investigated. The Carathéodory-Bárány theorem has a counterpart in arbitrary dimensions under suitable uniform compactness or uniform boundedness conditions. The proper generalization of the Helly-Bárány theorem reads...