AbstractWe present two basic lemmas on exact and approximate solutions of inclusions and equations in general spaces. Its applications involve Ekeland's principle, characterize calmness, lower semicontinuity and the Aubin property of solution sets in some Hoelder-type setting and connect these properties with certain iteration schemes of descent type. In this way, the mentioned stability properties can be directly characterized by convergence of more or less abstract solution procedures. New stability conditions will be derived, too. Our basic models are (multi-) functions on a complete metric space with images in a linear normed space
[[abstract]]In this paper, we prove the existence theorems of two types of systems of variational in...
summary:In this paper we examine nonlinear integrodifferential inclusions in $\Bbb R^N$. For the non...
The author proves a set-valued Gronwall lemma and a relaxation theorem for the semilinear different...
We present two basic lemmas on exact and approximate solutions of inclusions and equations in genera...
AbstractWe present two basic lemmas on exact and approximate solutions of inclusions and equations i...
We show in a rather general setting that Hoelder and Lipschitz stability properties of solutions to ...
We show in a rather general setting that Hoelder and Lipschitz stability properties of solutions to ...
Our paper deals with the interrelation of optimization methods and Lipschitz stability of multifunct...
Our paper deals with the interrelation of optimization methods and Lipschitz stability of multifunct...
Our paper deals with the interrelation of optimization methods and Lipschitz stability of multifunct...
International audienceResults on stability of both local and global metric regularity under set-valu...
We show how the philosophy of the theory of differential inclusions for Lipschitz mappings can be us...
AbstractIn this paper we address the question of solvability of the differential inclusions (1.1). O...
AbstractThis paper is devoted to existence of trajectories to differential equations and inclusions ...
AbstractIn this work we introduce a system of inclusion problems, which can be regarded as a general...
[[abstract]]In this paper, we prove the existence theorems of two types of systems of variational in...
summary:In this paper we examine nonlinear integrodifferential inclusions in $\Bbb R^N$. For the non...
The author proves a set-valued Gronwall lemma and a relaxation theorem for the semilinear different...
We present two basic lemmas on exact and approximate solutions of inclusions and equations in genera...
AbstractWe present two basic lemmas on exact and approximate solutions of inclusions and equations i...
We show in a rather general setting that Hoelder and Lipschitz stability properties of solutions to ...
We show in a rather general setting that Hoelder and Lipschitz stability properties of solutions to ...
Our paper deals with the interrelation of optimization methods and Lipschitz stability of multifunct...
Our paper deals with the interrelation of optimization methods and Lipschitz stability of multifunct...
Our paper deals with the interrelation of optimization methods and Lipschitz stability of multifunct...
International audienceResults on stability of both local and global metric regularity under set-valu...
We show how the philosophy of the theory of differential inclusions for Lipschitz mappings can be us...
AbstractIn this paper we address the question of solvability of the differential inclusions (1.1). O...
AbstractThis paper is devoted to existence of trajectories to differential equations and inclusions ...
AbstractIn this work we introduce a system of inclusion problems, which can be regarded as a general...
[[abstract]]In this paper, we prove the existence theorems of two types of systems of variational in...
summary:In this paper we examine nonlinear integrodifferential inclusions in $\Bbb R^N$. For the non...
The author proves a set-valued Gronwall lemma and a relaxation theorem for the semilinear different...