We consider a refined coderivative construction for nonsmooth and set-valued mappings between Banach spaces. This limiting mixed coderivative is different from “normal” coderivatives generated by normal cones/subdifferentials and turns out to be useful for studying some basic propertiers in variational analysis particularly related to Lipschitzian stability. We develop a strong calculus for this coderivative important for various applications
AbstractThis paper is devoted to the development of variational analysis and generalized differentia...
AbstractIn this paper we use the Fréchet, Clarke, and Mordukhovich coderivatives to obtain variants ...
ADInternational audienceThe paper is devoted to variational analysis of set-valued mappings acting f...
Abstract. We consider a refined coderivative construction for non-smooth and set-valued mappings bet...
AbstractWe study some generalized differentiability concepts for multifunctions and non-smooth mappi...
The paper is concerned with generalized differentiation of set-valued mappings between Banach spaces...
The paper contains calculus rules for coderivatives of compositions, sums and intersections of set-v...
AbstractThis paper is devoted to the development of variational analysis and generalized differentia...
Robust Lipschitzian properties of set-valued mappings and marginal functions play a crucial role in ...
In this paper, we apply the concept of coderivative and other tools from the generalized differentia...
This paper primarily concerns the study of general classes of constrained multiobjective optimizatio...
This paper primarily concerns the study of general classes of constrained multiobjective optimizatio...
In this paper, we apply the concept of coderivative and other tools from the generalized differentia...
In this paper, we study bornological generalized differential properties of sets with nonsmooth boun...
In this paper, we study bornological generalized differential properties of sets with nonsmooth boun...
AbstractThis paper is devoted to the development of variational analysis and generalized differentia...
AbstractIn this paper we use the Fréchet, Clarke, and Mordukhovich coderivatives to obtain variants ...
ADInternational audienceThe paper is devoted to variational analysis of set-valued mappings acting f...
Abstract. We consider a refined coderivative construction for non-smooth and set-valued mappings bet...
AbstractWe study some generalized differentiability concepts for multifunctions and non-smooth mappi...
The paper is concerned with generalized differentiation of set-valued mappings between Banach spaces...
The paper contains calculus rules for coderivatives of compositions, sums and intersections of set-v...
AbstractThis paper is devoted to the development of variational analysis and generalized differentia...
Robust Lipschitzian properties of set-valued mappings and marginal functions play a crucial role in ...
In this paper, we apply the concept of coderivative and other tools from the generalized differentia...
This paper primarily concerns the study of general classes of constrained multiobjective optimizatio...
This paper primarily concerns the study of general classes of constrained multiobjective optimizatio...
In this paper, we apply the concept of coderivative and other tools from the generalized differentia...
In this paper, we study bornological generalized differential properties of sets with nonsmooth boun...
In this paper, we study bornological generalized differential properties of sets with nonsmooth boun...
AbstractThis paper is devoted to the development of variational analysis and generalized differentia...
AbstractIn this paper we use the Fréchet, Clarke, and Mordukhovich coderivatives to obtain variants ...
ADInternational audienceThe paper is devoted to variational analysis of set-valued mappings acting f...
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