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Bound-Constrained Polynomial Optimization Using Only Elementary Calculations

Author

Listed:
  • Etienne de Klerk

    (Department of Econometrics and Operations Research, Tilburg University, 5037 AB Tilburg, Netherlands; and Delft Institute of Applied Mathematics, Delft University of Technology, 2628 CD Delft Netherlands)

  • Jean B. Lasserre

    (LAAS-CNRS and Institute of Mathematics, University of Toulouse, 31400 Toulouse, France)

  • Monique Laurent

    (Centrum Wiskunde and Informatica (CWI), 1098 XG Amsterdam, Netherlands; and Department of Econometrics and Operations Research, Tilburg University, 5037 AB Tilburg, Netherlands)

  • Zhao Sun

    (Symetrics B.V., 1097 DN Amsterdam, Netherlands)

Abstract

We provide a monotone nonincreasing sequence of upper bounds f k H ( k ≥ 1 ) converging to the global minimum of a polynomial f on simple sets like the unit hypercube in ℝ n . The novelty with respect to the converging sequence of upper bounds in Lasserre [Lasserre JB (2010) A new look at nonnegativity on closed sets and polynomial optimization, SIAM J. Optim. 21:864–885] is that only elementary computations are required. For optimization over the hypercube [0, 1] n , we show that the new bounds f k H have a rate of convergence in O ( 1 / k ) . Moreover, we show a stronger convergence rate in O (1/ k ) for quadratic polynomials and more generally for polynomials having a rational minimizer in the hypercube. In comparison, evaluation of all rational grid points with denominator k produces bounds with a rate of convergence in O (1/ k 2 ), but at the cost of O ( k n ) function evaluations, while the new bound f k H needs only O ( n k ) elementary calculations.

Suggested Citation

  • Etienne de Klerk & Jean B. Lasserre & Monique Laurent & Zhao Sun, 2017. "Bound-Constrained Polynomial Optimization Using Only Elementary Calculations," Mathematics of Operations Research, INFORMS, vol. 42(3), pages 834-853, August.
    • Handle: RePEc:inm:ormoor:v:42:y:2017:i:3:p:834-853
    DOI: 10.1287/moor.2016.0829
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    References listed on IDEAS

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    1. Jibetean, D. & de Klerk, E., 2006. "Global optimization of rational functions : A semidefinite programming approach," Other publications TiSEM 25febbc3-cd0c-4eb7-9d37-d, Tilburg University, School of Economics and Management.
    2. de Klerk, E. & Laurent, M., 2010. "Error bounds for some semidefinite programming approaches to polynomial minimization on the hypercube," Other publications TiSEM 619d9658-77df-4b5e-9868-0, Tilburg University, School of Economics and Management.
    3. de Klerk, E. & Laurent, M. & Parrilo, P., 2006. "A PTAS for the minimization of polynomials of fixed degree over the simplex," Other publications TiSEM 603897c9-179e-43e4-9e83-6, Tilburg University, School of Economics and Management.
    4. Jean B. Lasserre, 2002. "Semidefinite Programming vs. LP Relaxations for Polynomial Programming," Mathematics of Operations Research, INFORMS, vol. 27(2), pages 347-360, May.
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    1. de Klerk, Etienne & Laurent, Monique, 2018. "Worst-case examples for Lasserre's measure-based hierarchy for polynomial optimization on the hypercube," Other publications TiSEM a939e3b3-0361-42c9-8263-0, Tilburg University, School of Economics and Management.
    2. de Klerk, Etienne & Laurent, Monique, 2019. "A survey of semidefinite programming approaches to the generalized problem of moments and their error analysis," Other publications TiSEM d956492f-3e25-4dda-a5e2-e, Tilburg University, School of Economics and Management.
    3. Etienne de Klerk & Monique Laurent, 2018. "Comparison of Lasserre’s Measure-Based Bounds for Polynomial Optimization to Bounds Obtained by Simulated Annealing," Mathematics of Operations Research, INFORMS, vol. 43(4), pages 1317-1325, November.
    4. Etienne de Klerk & Monique Laurent, 2020. "Worst-Case Examples for Lasserre’s Measure–Based Hierarchy for Polynomial Optimization on the Hypercube," Mathematics of Operations Research, INFORMS, vol. 45(1), pages 86-98, February.

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