Mining for diamonds: Matrix generation algorithms for binary quadratically constrained quadratic problems

Enrico Bettiol, Immanuel Bomze (Corresponding author), Lucas Létocart, Francesco Rinaldi, Emiliano Traversi

Publications: Contribution to journalArticlePeer Reviewed

Abstract

In this paper, we consider binary quadratically constrained quadratic problems and propose a new approach to generate stronger bounds than the ones obtained using the Semidefinite Programming relaxation. The new relaxation is based on the Boolean Quadric Polytope and is solved via a Dantzig–Wolfe Reformulation in matrix space. For block-decomposable problems, we extend the relaxation and analyze the theoretical properties of this novel approach. If overlapping size of blocks is at most two (i.e., when the sparsity graph of any pair of intersecting blocks contains either a cut node or an induced diamond graph), we establish equivalence to the one based on the Boolean Quadric Polytope. We prove that this equivalence does not hold if the sparsity graph is not chordal and we conjecture that equivalence holds for any block structure with a chordal sparsity graph. The tailored decomposition algorithm in the matrix space is used for efficiently bounding sparsely structured problems. Preliminary numerical results show that the proposed approach yields very good bounds in reasonable time.

Original languageEnglish
Article number105735
JournalComputers and Operations Research
Volume142
DOIs
Publication statusPublished - Jun 2022

Austrian Fields of Science 2012

  • 101015 Operations research

Keywords

  • Binary quadratic problem
  • Boolean Quadric Polytope
  • Dantzig–Wolfe Reformulation
  • Sparse problem

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