The paper concerns parameterized equilibria governed by generalized equations whose multivalued parts are modeled via regular normals to nonconvex conic constraints. Our main goal is to derive a precise pointwise second-order formula for calculating the graphical derivative of the solution maps to such generalized equations that involves Lagrange multipliers of the corresponding KKT systems and critical cone directions. Then we apply the obtained formula to characterizing a Lipschitzian stability notion for the solution maps that is known as isolated calmness
Title: Hierarchical Problems with Evolutionary Equilibrium Constraints Author: Lukáš Adam Supervisor...
This paper deals with the computation of regular coderivatives of solution maps associated with a fr...
This paper is devoted to the development of new sufficient conditions for the calmness and the Aubin...
Artículo de publicación ISIThe paper concerns parameterized equilibria governed by generalized equat...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
The paper deals with co-derivative formulae for normal cone mappings to smooth inequality systems. B...
Artículo de publicación ISIThis paper is devoted to the study of a broad class of problems in conic ...
This paper provides formulas for calculating of Fr\'{e}chet and limiting normal cones with respect t...
The paper deals with a comprehensive theory of mappings, whose local behavior can be described by me...
In the paper we provide new conditions ensuring the isolated calmness property and the Aubin propert...
The paper deals with a new sharp condition ensuring the Aubin property of solution maps to a class o...
Robust Lipschitzian properties of set-valued mappings and marginal functions play a crucial role in ...
The paper conducts a second-order variational analysis for an important class of nonpolyhedral conic...
Title: Hierarchical Problems with Evolutionary Equilibrium Constraints Author: Lukáš Adam Supervisor...
This paper deals with the computation of regular coderivatives of solution maps associated with a fr...
This paper is devoted to the development of new sufficient conditions for the calmness and the Aubin...
Artículo de publicación ISIThe paper concerns parameterized equilibria governed by generalized equat...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
The paper deals with co-derivative formulae for normal cone mappings to smooth inequality systems. B...
Artículo de publicación ISIThis paper is devoted to the study of a broad class of problems in conic ...
This paper provides formulas for calculating of Fr\'{e}chet and limiting normal cones with respect t...
The paper deals with a comprehensive theory of mappings, whose local behavior can be described by me...
In the paper we provide new conditions ensuring the isolated calmness property and the Aubin propert...
The paper deals with a new sharp condition ensuring the Aubin property of solution maps to a class o...
Robust Lipschitzian properties of set-valued mappings and marginal functions play a crucial role in ...
The paper conducts a second-order variational analysis for an important class of nonpolyhedral conic...
Title: Hierarchical Problems with Evolutionary Equilibrium Constraints Author: Lukáš Adam Supervisor...
This paper deals with the computation of regular coderivatives of solution maps associated with a fr...
This paper is devoted to the development of new sufficient conditions for the calmness and the Aubin...