Constrained Best Approximation with Nonsmooth Nonconvex Constraints
Abstract
In this paper, we consider the constraint set of inequalities with nonsmooth nonconvex constraint functions. We show that under Abadie's constraint qualification the "perturbation property" of the best approximation to any in from a convex set is characterized by the strong conical hull intersection property (strong CHIP) of and where is a non-empty closed convex subset of and the set is represented by with is a tangentially convex function at a given point By using the idea of tangential subdifferential and a non-smooth version of Abadie's constraint qualification, we do this by first proving a dual cone characterization of the constraint set Moreover, we present sufficient conditions for which the strong CHIP property holds. In particular, when the set is closed and convex, we show that the Lagrange multiplier characterization of best approximation holds under a non-smooth version of Abadie's constraint qualification. The obtained results extend many corresponding results in the context of constrained best approximation. Several examples are provided to clarify the results.
Cite
@article{arxiv.1903.07723,
title = {Constrained Best Approximation with Nonsmooth Nonconvex Constraints},
author = {Hossein Mohebi},
journal= {arXiv preprint arXiv:1903.07723},
year = {2019}
}
Comments
20 pages; MS# 19-041 (2019)