Critical solutions of nonlinear equations: stability issues
成果类型:
Article
署名作者:
Izmailov, A. F.; Kurennoy, A. S.; Solodov, M. V.
署名单位:
Lomonosov Moscow State University; Peoples Friendship University of Russia; Derzhavin Tambov State University; Instituto Nacional de Matematica Pura e Aplicada (IMPA)
刊物名称:
MATHEMATICAL PROGRAMMING
ISSN/ISSBN:
0025-5610
DOI:
10.1007/s10107-016-1047-x
发表日期:
2018
页码:
475-507
关键词:
optimization problems
lipschitzian derivatives
critical multipliers
error-bounds
constraints
attraction
mappings
systems
SPACES
摘要:
It is known that when the set of Lagrange multipliers associated with a stationary point of a constrained optimization problem is not a singleton, this set may contain so-called critical multipliers. This special subset of Lagrange multipliers defines, to a great extent, stability pattern of the solution in question subject to parametric perturbations. Criticality of a Lagrange multiplier can be equivalently characterized by the absence of the local Lipschitzian error bound in terms of the natural residual of the optimality system. In this work, taking the view of criticality as that associated to the error bound, we extend the concept to general nonlinear equations (not necessarily with primal-dual optimality structure). Among other things, we show that while singular noncritical solutions of nonlinear equations can be expected to be stable only subject to some poor asymptotically thin classes of perturbations, critical solutions can be stable under rich classes of perturbations. This fact is quite remarkable, considering that in the case of nonisolated solutions, critical solutions usually form a thin subset within all the solutions. We also note that the results for general equations lead to some new insights into the properties of critical Lagrange multipliers (i.e., solutions of equations with primal-dual structure).