English

Improved Certificates for Independence Number in Semirandom Hypergraphs

Data Structures and Algorithms 2026-03-10 v1

Abstract

We study the problem of efficiently certifying upper bounds on the independence number of \ell-uniform hypergraphs. This is a notoriously hard problem, with efficient algorithms failing to approximate the independence number within n1ϵn^{1-\epsilon} factor in the worst case [Has99, Zuc07]. We study the problem in random and semirandom hypergraphs. There is a folklore reduction to the graph case, achieving a certifiable bound of O(n/p)O(\sqrt{n/p}). More recently, the work [GKM22] improved this by constructing spectral certificates that yield a bound of O(n.polylog(n)/p1/(/2))O(\sqrt{n}.\mathrm{polylog}(n)/p^{1/(\ell/2)}). We make two key improvements: firstly, we prove sharper bounds that get rid of pesky logarithmic factors in nn, and nearly attain the conjectured optimal (in both nn and pp) computational threshold of O(n/p1/)O(\sqrt{n}/p^{1/\ell}), and secondly, we design robust Sum-of-Squares (SoS) certificates, proving our bounds in the more challenging semirandom hypergraph model. Our analysis employs the proofs-to-algorithms paradigm [BS16, FKP19] in showing an upper bound for pseudo-expectation of degree-22\ell SoS relaxation of the natural polynomial system for maximum independent set. The challenging case is odd-arity hypergraphs, where we employ a tensor-based analysis that reduces the problem to proving bounds on a natural class of random chaos matrices associated with \ell-uniform hypergraphs. Previous bounds [AMP21, RT23] have a logarithmic dependence, which we remove by leveraging recent progress on matrix concentration inequalities [BBvH23, BLNvH25]; we believe these may be useful in other hypergraph problems. As an application, we show our improved certificates can be combined with an SoS relaxation of a natural rr-coloring polynomial system to recover an arbitrary planted rr-colorable subhypergraph in a semirandom model along the lines of [LPR25], which allows for strong adversaries.

Keywords

Cite

@article{arxiv.2603.08693,
  title  = {Improved Certificates for Independence Number in Semirandom Hypergraphs},
  author = {Pravesh Kothari and Anand Louis and Rameesh Paul and Prasad Raghavendra},
  journal= {arXiv preprint arXiv:2603.08693},
  year   = {2026}
}
R2 v1 2026-07-01T11:10:48.544Z