English

Pseudo basic steps: Bound improvement guarantees from Lagrangian decomposition in convex disjunctive programming

Optimization and Control 2025-01-28 v1

Abstract

An elementary, but fundamental, operation in disjunctive programming is a basic step, which is the intersection of two disjunctions to form a new disjunction. Basic steps bring a disjunctive set in regular form closer to its disjunctive normal form and, in turn, produce relaxations that are at least as tight. An open question is: What are guaranteed bounds on the improvement from a basic step? In this paper, using properties of a convex disjunctive program's hull reformulation and multipliers from Lagrangian decomposition, we introduce an operation called a pseudo basic step and use it to provide provable bounds on this improvement along with techniques to exploit this information when solving a disjunctive program as a convex MINLP. Numerical examples illustrate the practical benefits of these bounds. In particular, on a set of K-means clustering instances, we make significant bound improvements relative to state-of-the-art commercial mixed-integer programming solvers.

Keywords

Cite

@article{arxiv.2501.15345,
  title  = {Pseudo basic steps: Bound improvement guarantees from Lagrangian decomposition in convex disjunctive programming},
  author = {Dimitri J. Papageorgiou and Francisco Trespalacios},
  journal= {arXiv preprint arXiv:2501.15345},
  year   = {2025}
}

Comments

24 pages

R2 v1 2026-06-28T21:17:51.914Z