Add to ORKGAbstract. We extend the definition of the limiting Frechet subdifferential and the limiting.Frechet normal cone from Asplund spaces to Asplund generated spaces. Then we prove a sum rule, a mean value theorem, and other statements for this concept
The paper is devoted to the development of a comprehensive calculus for directional limiting normal ...
We show, largely convex examples, that most of the core results for subdifferential calculus fail wi...
A generalisation of strong subdifferentiability and its characterisations are given along with impli...
We extend the definition of the limiting Frechet subdifferential and the limiting Frechet normal con...
AbstractWe extend the definition of the limiting Fréchet subdifferential and the limiting Fréchet no...
We develop a generalized differentiation theory for nonsmooth functions and sets with nonsmooth boun...
AbstractWe develop an extended generalized differential calculus for normal cones to nonconvex sets,...
International audienceWe establish subdifferential calculus rules for the sum of convex functions de...
summary:A class of convex functions where the sets of subdifferentials behave like the unit ball of ...
Artículo de publicación ISISin acceso a texto completoWe establish subdifferential calculus rules fo...
AbstractThe formula of Clarke's subdifferential for the sum of two real-valued locally Lipschitz fun...
International audienceIn this paper we study the behaviour of normal cones and subdifferentials with...
AbstractIn this paper, we establish some calculus rules for the limiting Fréchet ϵ-subdifferentials ...
The theory presented in the paper consists of two parts. The first is devoted to basic concepts and ...
Tyt. z nagł.References p. 310.Dostępny również w formie drukowanej.ABSTRACT: Some functional-topolog...
The paper is devoted to the development of a comprehensive calculus for directional limiting normal ...
We show, largely convex examples, that most of the core results for subdifferential calculus fail wi...
A generalisation of strong subdifferentiability and its characterisations are given along with impli...
We extend the definition of the limiting Frechet subdifferential and the limiting Frechet normal con...
AbstractWe extend the definition of the limiting Fréchet subdifferential and the limiting Fréchet no...
We develop a generalized differentiation theory for nonsmooth functions and sets with nonsmooth boun...
AbstractWe develop an extended generalized differential calculus for normal cones to nonconvex sets,...
International audienceWe establish subdifferential calculus rules for the sum of convex functions de...
summary:A class of convex functions where the sets of subdifferentials behave like the unit ball of ...
Artículo de publicación ISISin acceso a texto completoWe establish subdifferential calculus rules fo...
AbstractThe formula of Clarke's subdifferential for the sum of two real-valued locally Lipschitz fun...
International audienceIn this paper we study the behaviour of normal cones and subdifferentials with...
AbstractIn this paper, we establish some calculus rules for the limiting Fréchet ϵ-subdifferentials ...
The theory presented in the paper consists of two parts. The first is devoted to basic concepts and ...
Tyt. z nagł.References p. 310.Dostępny również w formie drukowanej.ABSTRACT: Some functional-topolog...
The paper is devoted to the development of a comprehensive calculus for directional limiting normal ...
We show, largely convex examples, that most of the core results for subdifferential calculus fail wi...
A generalisation of strong subdifferentiability and its characterisations are given along with impli...