English

The Average Sensitivity of Bounded-Depth Formulas

Computational Complexity 2015-09-01 v1

Abstract

We show that unbounded fan-in boolean formulas of depth d+1d+1 and size ss have average sensitivity O(1dlogs)dO(\frac{1}{d}\log s)^d. In particular, this gives a tight 2Ω(d(n1/d1))2^{\Omega(d(n^{1/d}-1))} lower bound on the size of depth d+1d+1 formulas computing the \textsc{parity} function. These results strengthen the corresponding 2Ω(n1/d)2^{\Omega(n^{1/d})} and O(logs)dO(\log s)^d bounds for circuits due to H{\aa}stad (1986) and Boppana (1997). Our proof technique studies a random process where the Switching Lemma is applied to formulas in an efficient manner.

Keywords

Cite

@article{arxiv.1508.07677,
  title  = {The Average Sensitivity of Bounded-Depth Formulas},
  author = {Benjamin Rossman},
  journal= {arXiv preprint arXiv:1508.07677},
  year   = {2015}
}
R2 v1 2026-06-22T10:44:51.774Z