Semismooth homeomorphisms and strong stability of semidefinite and Lorentz complementarity problems
Mathematics of Operations Research
SC1 optimization reformulations of the generalized Nash equilibrium problem
Optimization Methods & Software
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In this paper we consider a generalization of Kojima's strong stability in nonlinear programs to variational inequalities constrained by a system of equations and inequalities. Roughly speaking, strong stability refers to the local existence and uniqueness of a solution of a system under small perturbations. The purpose of the paper is to establish a new and complete characterization for strongly stable generalized Karush-Kuhn-Tucker points and to give a complete characterization for strongly stable stationary solutions under the Mangasarian-Fromovitz constraint qualification.