Conic formulation of QPCCs applied to truly sparse QPs

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Abstract

We study (nonconvex) quadratic optimization problems with complementarity constraints, establishing an exact completely positive reformulation under—apparently new—mild conditions involving only the constraints, not the objective. Moreover, we also give the conditions for strong conic duality between the obtained completely positive problem and its dual. Our approach is based on purely continuous models which avoid any branching or use of large constants in implementation. An application to pursuing interpretable sparse solutions of quadratic optimization problems is shown to satisfy our settings, and therefore we link quadratic problems with an exact sparsity term ‖ x‖ to copositive optimization. The covered problem class includes sparse least-squares regression under linear constraints, for instance. Numerical comparisons between our method and other approximations are reported from the perspective of the objective function value.

Original languageEnglish
Pages (from-to)703-735
Number of pages33
JournalComputational Optimization and Applications: an international journal
Volume84
Issue number3
Early online date13 Dec 2022
DOIs
Publication statusPublished - Apr 2023

Austrian Fields of Science 2012

  • 101016 Optimisation
  • 101015 Operations research

Keywords

  • Complementarity constraints
  • Conic relaxation
  • Copositive optimization
  • Quadratic optimization
  • Sparsity

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