Scholtes relaxation method for pessimistic bilevel optimization
Scholtes relaxation method for pessimistic bilevel optimization
When the lower-level optimal solution set-valued mapping of a bilevel optimization problem is not single-valued, we are faced with an ill-posed problem, which gives rise to the optimistic and pessimistic bilevel optimization problems, as tractable algorithmic frameworks. However, solving the pessimistic bilevel optimization problem is far more challenging than the optimistic one; hence, the literature has mostly been dedicated to the latter class of the problem. The Scholtes relaxation has appeared to be one of the simplest and most efficient ways to solve the optimistic bilevel optimization problem in its Karush-Kuhn-Tucker (KKT) reformulation or the corresponding more general mathematical program with complementarity constraints (MPCC). Inspired by such a success, this paper studies the potential of the Scholtes relaxation in the context of the pessimistic bilevel optimization problem. To proceed, we consider a pessimistic bilevel optimization problem, where all the functions involved are at least continuously differentiable. Then assuming that the lower-level problem is convex, the KKT reformulation of the problem is considered under the Slater constraint qualification. Based on this KKT reformulation, we introduce the corresponding version of the Scholtes relaxation algorithm. We then construct theoretical results ensuring that the limit of a sequence of global/local optimal solutions (resp. stationary points) of the aforementioned Scholtes relaxation is a global/local optimal solution (resp. stationary point) of the KKT reformulation of the pessimistic bilevel program. The results are accompanied by technical constructions ensuring that the Scholtes relaxation algorithm is well-defined or that the corresponding parametric optimization problem is more tractable. Furthermore, we perform some numerical experiments to assess the performance of the Scholtes relaxation algorithm using various examples. In particular, we study the effectiveness of the algorithm in obtaining solutions that can satisfy the corresponding C-stationarity concept.
C-stationarity, KKT reformulation, Pessimistic bilevel optimization, Scholtes relaxation
Benchouk, Imane
24de1a5a-638a-49e4-b279-bf233c1a2588
Jolaoso, Lateef
102467df-eae0-4692-8668-7f73e8e02546
Nachi, Khadra
01cd10c4-e3b4-426b-ba9b-69e09d017f8a
Zemkoho, Alain
30c79e30-9879-48bd-8d0b-e2fbbc01269e
17 March 2025
Benchouk, Imane
24de1a5a-638a-49e4-b279-bf233c1a2588
Jolaoso, Lateef
102467df-eae0-4692-8668-7f73e8e02546
Nachi, Khadra
01cd10c4-e3b4-426b-ba9b-69e09d017f8a
Zemkoho, Alain
30c79e30-9879-48bd-8d0b-e2fbbc01269e
Benchouk, Imane, Jolaoso, Lateef, Nachi, Khadra and Zemkoho, Alain
(2025)
Scholtes relaxation method for pessimistic bilevel optimization.
Set-Valued and Variational Analysis, 33 (2), [10].
(doi:10.1007/s11228-025-00747-5).
Abstract
When the lower-level optimal solution set-valued mapping of a bilevel optimization problem is not single-valued, we are faced with an ill-posed problem, which gives rise to the optimistic and pessimistic bilevel optimization problems, as tractable algorithmic frameworks. However, solving the pessimistic bilevel optimization problem is far more challenging than the optimistic one; hence, the literature has mostly been dedicated to the latter class of the problem. The Scholtes relaxation has appeared to be one of the simplest and most efficient ways to solve the optimistic bilevel optimization problem in its Karush-Kuhn-Tucker (KKT) reformulation or the corresponding more general mathematical program with complementarity constraints (MPCC). Inspired by such a success, this paper studies the potential of the Scholtes relaxation in the context of the pessimistic bilevel optimization problem. To proceed, we consider a pessimistic bilevel optimization problem, where all the functions involved are at least continuously differentiable. Then assuming that the lower-level problem is convex, the KKT reformulation of the problem is considered under the Slater constraint qualification. Based on this KKT reformulation, we introduce the corresponding version of the Scholtes relaxation algorithm. We then construct theoretical results ensuring that the limit of a sequence of global/local optimal solutions (resp. stationary points) of the aforementioned Scholtes relaxation is a global/local optimal solution (resp. stationary point) of the KKT reformulation of the pessimistic bilevel program. The results are accompanied by technical constructions ensuring that the Scholtes relaxation algorithm is well-defined or that the corresponding parametric optimization problem is more tractable. Furthermore, we perform some numerical experiments to assess the performance of the Scholtes relaxation algorithm using various examples. In particular, we study the effectiveness of the algorithm in obtaining solutions that can satisfy the corresponding C-stationarity concept.
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s11228-025-00747-5
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Accepted/In Press date: 4 March 2025
Published date: 17 March 2025
Keywords:
C-stationarity, KKT reformulation, Pessimistic bilevel optimization, Scholtes relaxation
Identifiers
Local EPrints ID: 502493
URI: http://eprints.soton.ac.uk/id/eprint/502493
ISSN: 1877-0533
PURE UUID: 9652807d-1780-4710-87ec-b121a5f1e674
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Date deposited: 27 Jun 2025 16:36
Last modified: 22 Aug 2025 02:34
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Author:
Imane Benchouk
Author:
Khadra Nachi
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