Continuous selections in Banach spaces

E. Michael

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Operators and distributions

J. Mikusiński (1963)

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Mappings of Hilbert-Schmidt type; their applications to eigenfunction expansions and elliptic boundary problems

K. Maurin (1963)

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Antiproximinal ѕets in Banach ѕpaces

S. Cobzaş (1999)

Acta Universitatis Carolinae. Mathematica et Physica

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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 $f □ g (x) : = i n f_{y + z = x} (f (y) + g (z))$ 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 $f : X \to ℝ \cup + \infty$ on a reflexive Banach space such that $l i m_{∥ x ∥ \to \infty} f (x) / ∥ x ∥ = \infty$ 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)

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Quotients of Continuous Convex Functions on Nonreflexive Banach Spaces

P. Holický, O. F. K. Kalenda, L. Veselý, L. Zajíček (2007)

Bulletin of the Polish Academy of Sciences. Mathematics

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On each nonreflexive Banach space X there exists a positive continuous convex function f such that 1/f is not a d.c. function (i.e., a difference of two continuous convex functions). This result together with known ones implies that X is reflexive if and only if each everywhere defined quotient of two continuous convex functions is a d.c. function. Our construction also gives a stronger version of Klee's result concerning renormings of nonreflexive spaces and non-norm-attaining functionals. ...