A Strong Metric Subregularity Analysis of Nonsmooth Mappings Via Steepest Displacement Rate

A Strong Metric Subregularity Analysis of Nonsmooth Mappings Via Steepest Displacement Rate

0.00 Avg rating0 Votes
Article ID: iaor20163675
Volume: 171
Issue: 2
Start Page Number: 573
End Page Number: 599
Publication Date: Nov 2016
Journal: Journal of Optimization Theory and Applications
Authors:
Keywords: heuristics, graphs
Abstract:

In this paper, a systematic study of the strong metric subregularity property of mappings is carried out by means of a variational tool, called steepest displacement rate. With the aid of this tool, a simple characterization of strong metric subregularity for multifunctions acting in metric spaces is formulated. The resulting criterion is shown to be useful for establishing stability properties of the strong metric subregularity in the presence of perturbations, as well as for deriving various conditions, enabling one to detect such a property in the case of nonsmooth mappings. Some of these conditions, involving several nonsmooth analysis constructions, are then applied in studying the isolated calmness property of the solution mapping to parameterized generalized equations.

Reviews

Required fields are marked *. Your email address will not be published.