Sensitivity analysis for two-level value functions with applications to bilevel programming
Sensitivity analysis for two-level value functions with applications to bilevel programming
This paper contributes to a deeper understanding of the link between a now conventional framework in hierarchical optimization called the optimistic bilevel problem and its initial more difficult formulation that we call here the original optimistic bilevel optimization problem. It follows from this research that although the process of deriving necessary optimality conditions for the latter problem is more involved, the conditions themselves do not - to a large extent - differ from those known for the conventional problem. It has already been well recognized in the literature that for optimality conditions of the usual optimistic bilevel program appropriate coderivative constructions for the set-valued solution map of the lower-level problem could be used, while it is shown in this paper that for the original optimistic formulation we have to go a step further to require and justify a certain Lipschitz-like property of this map. This is related to the local Lipschitz continuity of the optimal value function of an optimization problem constrained by solutions to another optimization problem; this function is labeled here as the two-level value function. More generally, we conduct a detailed sensitivity analysis for value functions of mathematical programs with extended complementarity constraints. The results obtained in this vein are applied to the two-level value function and then to the original optimistic formulation of the bilevel optimization problem, for which we derive verifiable stationarity conditions of various types entirely in terms of the initial data.
1309-1343
Dempe, Stephan
a8716b3e-ae75-4998-a6b6-48a9171b925a
Mordukhovich, Boris S.
34e6e756-ab21-4760-a6db-fb1f1c94fd93
Zemkoho, Alain B.
30c79e30-9879-48bd-8d0b-e2fbbc01269e
9 October 2012
Dempe, Stephan
a8716b3e-ae75-4998-a6b6-48a9171b925a
Mordukhovich, Boris S.
34e6e756-ab21-4760-a6db-fb1f1c94fd93
Zemkoho, Alain B.
30c79e30-9879-48bd-8d0b-e2fbbc01269e
Dempe, Stephan, Mordukhovich, Boris S. and Zemkoho, Alain B.
(2012)
Sensitivity analysis for two-level value functions with applications to bilevel programming.
SIAM Journal on Optimization, 22 (4), .
(doi:10.1137/110845197).
Abstract
This paper contributes to a deeper understanding of the link between a now conventional framework in hierarchical optimization called the optimistic bilevel problem and its initial more difficult formulation that we call here the original optimistic bilevel optimization problem. It follows from this research that although the process of deriving necessary optimality conditions for the latter problem is more involved, the conditions themselves do not - to a large extent - differ from those known for the conventional problem. It has already been well recognized in the literature that for optimality conditions of the usual optimistic bilevel program appropriate coderivative constructions for the set-valued solution map of the lower-level problem could be used, while it is shown in this paper that for the original optimistic formulation we have to go a step further to require and justify a certain Lipschitz-like property of this map. This is related to the local Lipschitz continuity of the optimal value function of an optimization problem constrained by solutions to another optimization problem; this function is labeled here as the two-level value function. More generally, we conduct a detailed sensitivity analysis for value functions of mathematical programs with extended complementarity constraints. The results obtained in this vein are applied to the two-level value function and then to the original optimistic formulation of the bilevel optimization problem, for which we derive verifiable stationarity conditions of various types entirely in terms of the initial data.
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110845197
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Published date: 9 October 2012
Organisations:
Operational Research
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Local EPrints ID: 370841
URI: http://eprints.soton.ac.uk/id/eprint/370841
ISSN: 1052-6234
PURE UUID: c7c26c59-7a8e-474e-9bce-599d471c9e09
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Date deposited: 10 Nov 2014 13:28
Last modified: 15 Mar 2024 03:51
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Author:
Stephan Dempe
Author:
Boris S. Mordukhovich
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