polynomial optimization

Polynomial argmin for recovery and approximation of multivariate discontinuous functions

  • Didier Henrion
  • Milan Korda
  • Jean-Bernard Lasserre
    • Categories Basic Sciences Applications, Linear, Cone and Semidefinite Programming, Semi-definite Programming Tags , ,

    We propose to approximate a (possibly discontinuous) multivariate function f(x) on a compact set by the partial minimizer arg min_y p(x,y) of an appropriate polynomial p whose construction can be cast in a univariate sum of squares (SOS) framework, resulting in a highly structured convex semidefinite program. In a number of non-trivial cases (e.g. when … Read more

    Strengthening SONC Relaxations with Constraints Derived from Variable Bounds

  • Ksenia Bestuzheva
  • Ambros Gleixner
    • Categories Constrained Nonlinear Optimization, Global Optimization, Optimization Software Design Principles Tags , , ,

    Nonnegativity certificates can be used to obtain tight dual bounds for polynomial optimization problems. Hierarchies of certificate-based relaxations ensure convergence to the global optimum, but higher levels of such hierarchies can become very computationally expensive, and the well-known sums of squares hierarchies scale poorly with the degree of the polynomials. This has motivated research into … Read more

    Weighted Geometric Mean, Minimum Mediated Set, and Optimal Second-Order Cone Representation

  • Jie Wang
    • Categories Cone Programming, Convex Optimization, Second-Order Cone Programming Tags , , , ,

    We study optimal second-order cone representations for weighted geometric means, which turns out to be closely related to minimum mediated sets. Several lower bounds and upper bounds on the size of optimal second-order cone representations are proved. In the case of bivariate weighted geometric means (equivalently, one dimensional mediated sets), we are able to prove … Read more

    Learning for Spatial Branching: An Algorithm Selection Approach

  • Bissan Ghaddar
  • Ignacio Gómez-Casares
  • Julio González-Díaz
  • Brais González-Rodríguez
  • Beatriz Pateiro-López
  • Sofía Rodríguez-Ballesteros
    • Categories Nonlinear Optimization Tags , , , ,

    The use of machine learning techniques to improve the performance of branch-and-bound optimization algorithms is a very active area in the context of mixed integer linear problems, but little has been done for non-linear optimization. To bridge this gap, we develop a learning framework for spatial branching and show its efficacy in the context of … Read more

    Bounding the separable rank via polynomial optimization

  • Sander Gribling
  • Monique Laurent
  • Andries Steenkamp
    • Categories Convex and Nonsmooth Optimization, Global Optimization Tags , , , , ,

    We investigate questions related to the set $\mathcal{SEP}_d$ consisting of the linear maps $\rho$ acting on $\mathbb{C}^d\otimes \mathbb{C}^d$ that can be written as a convex combination of rank one matrices of the form $xx^*\otimes yy^*$. Such maps are known in quantum information theory as the separable bipartite states, while nonseparable states are called entangled. In … Read more

    Sums of Separable and Quadratic Polynomials

  • Amir Ali Ahmadi
  • Cemil Dibek
  • Georgina Hall
    • Categories Linear, Cone and Semidefinite Programming, Nonlinear Optimization, Statistics Tags , ,

    We study separable plus quadratic (SPQ) polynomials, i.e., polynomials that are the sum of univariate polynomials in different variables and a quadratic polynomial. Motivated by the fact that nonnegative separable and nonnegative quadratic polynomials are sums of squares, we study whether nonnegative SPQ polynomials are (i) the sum of a nonnegative separable and a nonnegative … Read more

    Finite convergence of sum-of-squares hierarchies for the stability number of a graph

  • Monique Laurent
  • Luis Felipe Vargas
    • Categories Combinatorial Optimization, Linear, Cone and Semidefinite Programming Tags , , , , , , , , ,

    We investigate a hierarchy of semidefinite bounds $\vartheta^{(r)}(G)$ for the stability number $\alpha(G)$ of a graph $G$, based on its copositive programming formulation and introduced by de Klerk and Pasechnik [SIAM J. Optim. 12 (2002), pp.875–892], who conjectured convergence to $\alpha(G)$ in $r=\alpha(G) -1$ steps. Even the weaker conjecture claiming finite convergence is still open. … Read more

    Complexity, Exactness, and Rationality in Polynomial Optimization

  • Daniel Bienstock
  • Alberto Del Pia
  • Robert Hildebrand
    • Categories Global Optimization Theory, Nonlinear Optimization Tags , ,

    We study representation of solutions and certificates to quadratic and cubic optimization problems. Specifically, we focus on minimizing a cubic function over a polyhedron and also minimizing a linear function over quadratic constraints. We show when there exist rational feasible solutions (and if we can detect them) and when we can prove feasibility of sublevel … Read more

    Optimizing hypergraph-based polynomials modeling job-occupancy in queueing with redundancy scheduling

  • Daniel Brosch
  • Monique Laurent
  • Andries Steenkamp
    • Categories Constrained Nonlinear Optimization Tags , , ,

    We investigate two classes of multivariate polynomials with variables indexed by the edges of a uniform hypergraph and coefficients depending on certain patterns of union of edges. These polynomials arise naturally to model job-occupancy in some queuing problems with redundancy scheduling policy. The question, posed by Cardinaels, Borstand van Leeuwaarden (arXiv:2005.14566, 2020), is to decide … Read more

    Global optimality in minimum compliance topology optimization of frames and shells by moment-sum-of-squares hierarchy

  • Didier Henrion
  • Martin Kružík
  • Marek Tyburec
  • Jan Zeman
    • Categories Civil and Environmental Engineering, Constrained Nonlinear Optimization, Semi-definite Programming Tags , , , , ,

    The design of minimum-compliance bending-resistant structures with continuous cross-section parameters is a challenging task because of its inherent non-convexity. Our contribution develops a strategy that facilitates computing all guaranteed globally optimal solutions for frame and shell structures under multiple load cases and self-weight. To this purpose, we exploit the fact that the stiffness matrix is … Read more