WEAK SHARP MINIMA ON RIEMANNIAN MANIFOLDS

被引：90

作者：

Li, Chong ^{[1
,2
]}

Mordukhovich, Boris S. ^{[3
,4
]}

Wang, Jinhua ^{[5
]}

Yao, Jen-Chih ^{[6
]}

机构：

[1] Zhejiang Univ, Dept Math, Hangzhou 310027, Peoples R China

[2] King Saud Univ, Coll Sci, Dept Math, Riyadh 11451, Saudi Arabia

[3] Wayne State Univ, Dept Math, Detroit, MI 48202 USA

[4] King Fahd Univ Petr & Minerals, Dept Math & Stat, Dhahran 31261, Saudi Arabia

[5] Zhejiang Univ Technol, Dept Math, Hangzhou 310032, Zhejiang, Peoples R China

[6] Kaohsiung Med Univ, Ctr Gen Educ, Kaohsiung 80702, Taiwan

来源：

SIAM JOURNAL ON OPTIMIZATION | 2011年 / 21卷 / 04期

基金：

美国国家科学基金会; 中国国家自然科学基金; 澳大利亚研究理事会;

关键词：

variational analysis and optimization; weak sharp minima; Riemannian manifolds; Hadamard manifolds; convexity; generalized differentiability; PROXIMAL POINT ALGORITHM; MONOTONE VECTOR-FIELDS; GLOBAL ERROR-BOUNDS; NEWTONS METHOD; CONSTRAINT QUALIFICATIONS; OPTIMALITY CONDITIONS; OPTIMIZATION PROBLEMS; CONVEX MINIMIZATION; NONSMOOTH ANALYSIS; LINEAR REGULARITY;

D O I：

10.1137/09075367X

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

This is the first paper dealing with the study of weak sharp minima for constrained optimization problems on Riemannian manifolds, which are important in many applications. We consider the notions of local weak sharp minima, boundedly weak sharp minima, and global weak sharp minima for such problems and establish their complete characterizations in the case of convex problems on finite-dimensional Riemannian manifolds and Hadamard manifolds. A number of the results obtained in this paper are also new for the case of conventional problems in finite-dimensional Euclidean spaces. Our methods involve appropriate tools of variational analysis and generalized differentiation on Riemannian and Hadamard manifolds developed and efficiently implemented in this paper.

引用

页码：1523 / 1560

页数：38

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