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Maximization of a Convex Quadratic Form on a Polytope: Factorization and the Chebyshev Norm Bounds
- 1.0507646 - ÚI 2021 RIV CH eng C - Conference Paper (international conference)
Hladík, M. - Hartman, David
Maximization of a Convex Quadratic Form on a Polytope: Factorization and the Chebyshev Norm Bounds.
Optimization of Complex Systems: Theory, Models, Algorithms and Applications. Cham: Springer, 2020 - (Le Thi, H.; Minh Le, H.; Pham Dinh, T.), s. 119-127. Advances in Intelligent Systems and Computing, 991. ISBN 978-3-030-21802-7.
[WCGO 2019: World Congress on Global Optimization /6./. Metz (FR), 08.07.2019-10.07.2019]
Institutional support: RVO:67985807
Keywords : Convex quadratic form * Relaxation * NP-hardness * Interval computation
OECD category: Pure mathematics
Maximization of a convex quadratic form on a convex polyhedral set is an NP-hard problem. We focus on computing an upper bound based on a factorization of the quadratic form matrix and employment of the maximum vector norm. Effectivity of this approach depends on the factorization used. We discuss several choices as well as iterative methods to improve performance of a particular factorization. We carried out numerical experiments to compare various alternatives and to compare our approach with other standard approaches, including McCormick envelopes.
Permanent Link: http://hdl.handle.net/11104/0298623
Number of the records: 1