Our paper deals with the interrelation of optimization methods and Lipschitz stability of multifunctions in arbitrary Banach spaces. Roughly speaking, we show that linear convergence of several first order methods and Lipschitz stability mean the same. Particularly, we characterize calmness and the Aubin property by uniformly (with respect to certain starting points) linear convergence of descent methods and approximate projection methods. So we obtain, e.g., solution methods (for solving equations or variational problems) which require calmness only. The relations of these methods to several known basic algorithms are discussed, and errors in the subroutines as well as deformations of the given mappings are permitted. We also recall how su...
We show in a rather general setting that Hoelder and Lipschitz stability properties of solutions to ...
We present two basic lemmas on exact and approximate solutions of inclusions and equations in genera...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
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...
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...
Abstract. Our paper deals with the interrelation of optimization methods and Lipschitz stability of ...
We present two basic lemmas on exact and approximate solutions of inclusions and equations in genera...
We show in a rather general setting that Hoelder and Lipschitz stability properties of solutions to ...
The paper concerns the study of variational systems described by parameterized generalized equations...
We characterize calmness of multifunctions explicitly by calmness of level sets to globally Lipschit...
We characterize calmness of multifunctions explicitly by calmness of level sets to globally Lipschit...
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 ...
We present two basic lemmas on exact and approximate solutions of inclusions and equations in genera...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...
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...
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...
Abstract. Our paper deals with the interrelation of optimization methods and Lipschitz stability of ...
We present two basic lemmas on exact and approximate solutions of inclusions and equations in genera...
We show in a rather general setting that Hoelder and Lipschitz stability properties of solutions to ...
The paper concerns the study of variational systems described by parameterized generalized equations...
We characterize calmness of multifunctions explicitly by calmness of level sets to globally Lipschit...
We characterize calmness of multifunctions explicitly by calmness of level sets to globally Lipschit...
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 ...
We present two basic lemmas on exact and approximate solutions of inclusions and equations in genera...
This paper concerns applications of advanced techniques of variational analysis and generalized diff...