Gert Wanka, Oleg Wilfer: Duality Results for Nonlinear Single Minimax Location Problems via Multi-Composed Optimization
- Author(s):
-
Gert Wanka
Oleg Wilfer
- Title:
-
Gert Wanka, Oleg Wilfer: Duality Results for Nonlinear Single Minimax Location Problems via Multi-Composed Optimization
- Electronic source:
-
application/pdf
- Preprint series:
- Technische Universität Chemnitz, Fakultät für Mathematik (Germany). Preprint 02, 2016
- Mathematics Subject Classification:
-
none
[]
- Abstract:
- In the framework of conjugate duality we discuss nonlinear and linear single minimax location problems with geometric constraints, where the gauges are defined by convex sets of a Frechet space. The version of the nonlinear location problem is additionally considered with set-up costs. Associated dual problems for this kind of location problems will be formulated as well as corresponding duality statements. As conclusion of this paper, we give a geometrical interpretation of the optimal solutions of the dual problem of an unconstraint linear single minimax location problem when the gauges are a norm. For an illustration, an example in the Euclidean space will follow.
- Keywords:
-
Conjugate Duality,
Composed Functions,
Gauges,
Nonlinear Minimax Location Problems,
Set-up Costs,
Optimality Conditions
- Language:
- English
- Publication time:
- 2/2016
