The dissertation introduces and studies the notions of Lipschitzian and Holderian full stability of solutions to three-parametric variational systems described in the generalized equation formalism involving nonsmooth base mappings and partial subgradients of prox-regular functions acting in Hilbert spaces. Employing advanced tools and techniques of second-order variational analysis allows us to establish complete characterizations of, as well as directly variable sufficient conditions for, such full stability properties under mild assumptions. Furthermore, we derive exact formulas and effective quantitative estimates for the corresponding moduli
This paper mainly concerns the study of a large class of variational systems governed by parametric ...
International audienceThis survey article addresses the class of continuous-time systems where a sys...
The dissertation is devoted to the study of the so-called full Lipschitzian stability of local solu...
The paper introduces and studies the notions of Lipschitzian and Hölderian full stability of solutio...
The paper concerns the study of variational systems described by parameterized generalized equations...
The dissertation concerns a systematic study of full stability in general optimization models includ...
The dissertation is devoted to the development of variational analysis and generalized differentiati...
The paper concerns the study of variational systems described by parameterized generalized equations...
This dissertation focuses on the study and applications of some significant properties in well-posed...
The paper is devoted to the study of metric regularity, which is a remarkable property of set-valued...
In this paper we study the problem of stability of solutions of a classical variational inequality i...
Robust Lipschitzian properties of set-valued mappings and marginal functions play a crucial role in ...
This paper concerns second-order analysis for a remarkable class of variational systems in finite-di...
This paper investigates a well-posedness property of parametric constraint systems which we call Rob...
Regularity properties lie at the core of variational analysis because of their importance for stabil...
This paper mainly concerns the study of a large class of variational systems governed by parametric ...
International audienceThis survey article addresses the class of continuous-time systems where a sys...
The dissertation is devoted to the study of the so-called full Lipschitzian stability of local solu...
The paper introduces and studies the notions of Lipschitzian and Hölderian full stability of solutio...
The paper concerns the study of variational systems described by parameterized generalized equations...
The dissertation concerns a systematic study of full stability in general optimization models includ...
The dissertation is devoted to the development of variational analysis and generalized differentiati...
The paper concerns the study of variational systems described by parameterized generalized equations...
This dissertation focuses on the study and applications of some significant properties in well-posed...
The paper is devoted to the study of metric regularity, which is a remarkable property of set-valued...
In this paper we study the problem of stability of solutions of a classical variational inequality i...
Robust Lipschitzian properties of set-valued mappings and marginal functions play a crucial role in ...
This paper concerns second-order analysis for a remarkable class of variational systems in finite-di...
This paper investigates a well-posedness property of parametric constraint systems which we call Rob...
Regularity properties lie at the core of variational analysis because of their importance for stabil...
This paper mainly concerns the study of a large class of variational systems governed by parametric ...
International audienceThis survey article addresses the class of continuous-time systems where a sys...
The dissertation is devoted to the study of the so-called full Lipschitzian stability of local solu...