This dissertation focuses on the study and applications of some significant properties in well-posedness and sensitivity analysis, among which the notions of uniform metric regularity , higher-order metric subregularity and its strong subregularity counterpart play an essential role in modern variational analysis. We derived verifiable sufficient conditions and necessary conditions for those notions in terms of appropriate generalized differential as well as geometric constructions of variational analysis. Concrete examples are provided to illustrate the behavior and compare the results. Optimality conditions of parametric variational systems (PVS) under equilibrium constraints are also investigated via the terms of coderivatives. We deriv...
Building on fundamental results in variational analysis, this monograph presents new and recent deve...
The dissertation is devoted to the study of the so-called full Lipschitzian stability of local solu...
AMS subject classification: 49K40, 90C31.For a given abstract optimization problem in a Banach space...
The dissertation is devoted to the development of variational analysis and generalized differentiati...
The dissertation concerns a systematic study of full stability in general optimization models includ...
The paper concerns foundations of sensitivity and stability analysis, being primarily addressed cons...
In this note we consider some notions of well-posedness for scalar and vector variational inequalit...
In this dissertation we investigate some applications of variational analysis in optimization theory...
The dissertation introduces and studies the notions of Lipschitzian and Holderian full stability of ...
Regularity properties lie at the core of variational analysis because of their importance for stabil...
The paper concerns the study of variational systems described by parameterized generalized equations...
This paper investigates a well-posedness property of parametric constraint systems which we call Rob...
In this paper we analyze the property of Tykhonov wellposedness in relation to other well-posedness...
The paper concerns the study of variational systems described by parameterized generalized equations...
This book presents in a unified way the mathematical theory of well-posedness in optimization. The b...
Building on fundamental results in variational analysis, this monograph presents new and recent deve...
The dissertation is devoted to the study of the so-called full Lipschitzian stability of local solu...
AMS subject classification: 49K40, 90C31.For a given abstract optimization problem in a Banach space...
The dissertation is devoted to the development of variational analysis and generalized differentiati...
The dissertation concerns a systematic study of full stability in general optimization models includ...
The paper concerns foundations of sensitivity and stability analysis, being primarily addressed cons...
In this note we consider some notions of well-posedness for scalar and vector variational inequalit...
In this dissertation we investigate some applications of variational analysis in optimization theory...
The dissertation introduces and studies the notions of Lipschitzian and Holderian full stability of ...
Regularity properties lie at the core of variational analysis because of their importance for stabil...
The paper concerns the study of variational systems described by parameterized generalized equations...
This paper investigates a well-posedness property of parametric constraint systems which we call Rob...
In this paper we analyze the property of Tykhonov wellposedness in relation to other well-posedness...
The paper concerns the study of variational systems described by parameterized generalized equations...
This book presents in a unified way the mathematical theory of well-posedness in optimization. The b...
Building on fundamental results in variational analysis, this monograph presents new and recent deve...
The dissertation is devoted to the study of the so-called full Lipschitzian stability of local solu...
AMS subject classification: 49K40, 90C31.For a given abstract optimization problem in a Banach space...