[language-switcher]

Título: Stabilityof C-stationary Points for Mathematical Programs with Complementarity Constraints.
Ponente:   Jan-J. Rückmann (University of Bergen)
Organizador: Juan Parra
Fecha: Lunes 8 de junio a las 12:00 horas.
PRÓXIMAMENTE ENLACE AL VÍDEO
Abstract: 
We consider the class of mathematical programs with complementarity constraints (MPCC). Under an appropriate constraint qualification of Mangasarian-Fromovitz type we present a topological and an equivalent algebraic characterization of a stronglystable C-stationary point of MPCC. Strong stability refers to the local uniqueness, existence and continuous dependence of a solution for each sufficiently small perturbed problem where perturbations up to second order are allowed. This concept of strong stability was originally introduced by Kojima for standard nonlinear optimization; here, its generalization to MPCC demands a sophisticated technique which takes the combinatorial properties of the solution set of MPCC into account.