The classical notions of essential smoothness, essential strict convexity, and Legendreness for convex functions are extended from Euclidean to Banach spaces. A pertinent duality theory is developed and several useful characterizations are given. The proofs rely on new results on the more subtle behavior of subdifferentials and directional derivatives at boundary points of the domain. In weak Asplund spaces, a new formula allows the recovery of the subdifferential from nearby gradients. Finally, it is shown that every Legendre function on a reflexive Banach space is zone consistent, a fundamental property in the analysis of optimization algorithms based on Bregman distances. Numerous illustrating examples are provided
* This work was supported by the CNR while the author was visiting the University of Milan.To a conv...
Each lower semi-continuous proper convex function / on a Banach space E defines a certain multivalue...
We show that, typically, lower semicontinuous functions on a Banach space densely inherit lower subd...
The classical notions of essential smoothness, essential strict convexity, and Legendreness for conv...
The classical notions of essential smoothness, essential strict convexity, and Legendreness for conv...
A 2001 article by Bauschke, Borwein and Combettes showed how to extend naturally the classical defin...
The convex feasibility problem, that is, finding a point in the intersection of finitely many closed...
The convex feasibility problem, that is, nding a point in the intersection of nitely many closed co...
AbstractA new distance is introduced on the space of extended real-valued, lower semicontinuous conv...
A norm ||⋅|| on a Banach space X is Fréchet differentiable at x ∈ X if there is a functional ∫∈ X* s...
If the second dual of a Banach space E is smooth at each point of a certain norm dense subset, then ...
We present a detailed study of right and left Bregman strongly nonexpansive operators in reflexive B...
Abstract. An iterative method is proposed to construct the Bregman projec-tion of a point onto a cou...
AbstractWe prove that in a Banach space X with rotund dual X* a Chebyshev set C is convex iff the di...
In [2] we characterized in terms of a quadratic growth condition various metric regularity propertie...
* This work was supported by the CNR while the author was visiting the University of Milan.To a conv...
Each lower semi-continuous proper convex function / on a Banach space E defines a certain multivalue...
We show that, typically, lower semicontinuous functions on a Banach space densely inherit lower subd...
The classical notions of essential smoothness, essential strict convexity, and Legendreness for conv...
The classical notions of essential smoothness, essential strict convexity, and Legendreness for conv...
A 2001 article by Bauschke, Borwein and Combettes showed how to extend naturally the classical defin...
The convex feasibility problem, that is, finding a point in the intersection of finitely many closed...
The convex feasibility problem, that is, nding a point in the intersection of nitely many closed co...
AbstractA new distance is introduced on the space of extended real-valued, lower semicontinuous conv...
A norm ||⋅|| on a Banach space X is Fréchet differentiable at x ∈ X if there is a functional ∫∈ X* s...
If the second dual of a Banach space E is smooth at each point of a certain norm dense subset, then ...
We present a detailed study of right and left Bregman strongly nonexpansive operators in reflexive B...
Abstract. An iterative method is proposed to construct the Bregman projec-tion of a point onto a cou...
AbstractWe prove that in a Banach space X with rotund dual X* a Chebyshev set C is convex iff the di...
In [2] we characterized in terms of a quadratic growth condition various metric regularity propertie...
* This work was supported by the CNR while the author was visiting the University of Milan.To a conv...
Each lower semi-continuous proper convex function / on a Banach space E defines a certain multivalue...
We show that, typically, lower semicontinuous functions on a Banach space densely inherit lower subd...