English

Tight Sum-of-Squares lower bounds for binary polynomial optimization problems

Computational Complexity 2016-05-11 v1 Data Structures and Algorithms

Abstract

We give two results concerning the power of the Sum-of-Squares(SoS)/Lasserre hierarchy. For binary polynomial optimization problems of degree 2d2d and an odd number of variables nn, we prove that n+2d12\frac{n+2d-1}{2} levels of the SoS/Lasserre hierarchy are necessary to provide the exact optimal value. This matches the recent upper bound result by Sakaue, Takeda, Kim and Ito. Additionally, we study a conjecture by Laurent, who considered the linear representation of a set with no integral points. She showed that the Sherali-Adams hierarchy requires nn levels to detect the empty integer hull, and conjectured that the SoS/Lasserre rank for the same problem is n1n-1. We disprove this conjecture and derive lower and upper bounds for the rank.

Keywords

Cite

@article{arxiv.1605.03019,
  title  = {Tight Sum-of-Squares lower bounds for binary polynomial optimization problems},
  author = {Adam Kurpisz and Samuli Leppänen and Monaldo Mastrolilli},
  journal= {arXiv preprint arXiv:1605.03019},
  year   = {2016}
}
R2 v1 2026-06-22T13:57:30.906Z