621. Solving Bilevel Optimization Problems using Finite Elements and Reduced Order Methods
Invited abstract in session TB-7: Nonsmooth Bilevel Optimization, stream Bilevel and multilevel optimization.
Tuesday, 10:30-12:30Room: B100/5015
Authors (first author is the speaker)
| 1. | Floriane Mefo Kue
|
| Research Center, African Institute for Mathematical Sciences Cameroon |
Abstract
We consider bilevel optimization problems which can be interpreted as inverse optimal control problems. The lower-level problem is an optimal control problem with a parametrized objective function. The upper-level problem is used to identify the parameters of the lower-level problem. We then consider the Karush-Kuhn-Tucker reformulation of the problem and the main focus is on the derivation of first-order necessary optimality conditions and solutions algorithms via finite elements methods and reduced order methods.
Keywords
- Applications of continuous optimization
- Multi-level optimization
- Complementarity and variational problems
Status: accepted
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