English

Lower bounds for CSP refutation by SDP hierarchies

Computational Complexity 2016-10-11 v1

Abstract

For a kk-ary predicate PP, a random instance of CSP(P)(P) with nn variables and mm constraints is unsatisfiable with high probability when mnm \gg n. The natural algorithmic task in this regime is \emph{refutation}: finding a proof that a given random instance is unsatisfiable. Recent work of Allen et al. suggests that the difficulty of refuting CSP(P)(P) using an SDP is determined by a parameter cmplx(P)\mathrm{cmplx}(P), the smallest tt for which there does not exist a tt-wise uniform distribution over satisfying assignments to PP. In particular they show that random instances of CSP(P)(P) with mncmplx(P)/2m \gg n^{\mathrm{cmplx(P)}/2} can be refuted efficiently using an SDP. In this work, we give evidence that ncmplx(P)/2n^{\mathrm{cmplx}(P)/2} constraints are also \emph{necessary} for refutation using SDPs. Specifically, we show that if PP supports a (t1)(t-1)-wise uniform distribution over satisfying assignments, then the Sherali-Adams+_+ and Lov\'{a}sz-Schrijver+_+ SDP hierarchies cannot refute a random instance of CSP(P)(P) in polynomial time for any mnt/2ϵm \leq n^{t/2-\epsilon}.

Keywords

Cite

@article{arxiv.1610.03029,
  title  = {Lower bounds for CSP refutation by SDP hierarchies},
  author = {Ryuhei Mori and David Witmer},
  journal= {arXiv preprint arXiv:1610.03029},
  year   = {2016}
}
R2 v1 2026-06-22T16:16:44.867Z