English

Monotone Circuit Lower Bounds from Robust Sunflowers

Computational Complexity 2022-08-08 v2

Abstract

Robust sunflowers are a generalization of combinatorial sunflowers that have applications in monotone circuit complexity, DNF sparsification, randomness extractors, and recent advances on the Erd\H{o}s-Rado sunflower conjecture. The recent breakthrough of Alweiss, Lovett, Wu and Zhang gives an improved bound on the maximum size of a ww-set system that excludes a robust sunflower. In this paper, we use this result to obtain an exp(n1/2o(1))\exp(n^{1/2-o(1)}) lower bound on the monotone circuit size of an explicit nn-variate monotone function, improving the previous best known exp(n1/3o(1))\exp(n^{1/3-o(1)}) due to Andreev and Harnik and Raz. We also show an exp(Ω(n))\exp(\Omega(n)) lower bound on the monotone arithmetic circuit size of a related polynomial. Finally, we introduce a notion of robust clique-sunflowers and use this to prove an nΩ(k)n^{\Omega(k)} lower bound on the monotone circuit size of the CLIQUE function for all kn1/3o(1)k \le n^{1/3-o(1)}, strengthening the bound of Alon and Boppana.

Keywords

Cite

@article{arxiv.2012.03883,
  title  = {Monotone Circuit Lower Bounds from Robust Sunflowers},
  author = {Bruno Pasqualotto Cavalar and Mrinal Kumar and Benjamin Rossman},
  journal= {arXiv preprint arXiv:2012.03883},
  year   = {2022}
}

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Journal version

R2 v1 2026-06-23T20:47:26.448Z