On coderivatives and lipschitzian properties of the dual pair in optimization

In this paper we apply the concept of coderivative and other tools from the generalized di§erentiation theory for set-valued mappings to study the stability of the feasible sets of both, the primal and the dual problem in infinite-dimensional linear optimization with infinitely many explicit const...

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Detalles Bibliográficos
Autores principales: López, Marco A., Ridolfi, Andrea B., Vera de Serio, Virginia N.
Publicado: 2011
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Acceso en línea:https://bdigital.uncu.edu.ar/fichas.php?idobjeto=11807
Descripción
Sumario:In this paper we apply the concept of coderivative and other tools from the generalized di§erentiation theory for set-valued mappings to study the stability of the feasible sets of both, the primal and the dual problem in infinite-dimensional linear optimization with infinitely many explicit constraints and an additional conic constraint. After providing some specific duality results for our dual pair, we study the Lipschitz-like property of both mappings and also give bounds for the associated Lipschitz moduli. The situation for the dual shows much more involved than the case of the primal problem.