Criticality of AC0 formulae

Abstract

Rossman [In Proc. 34th Comput. Complexity Conf., 2019] introduced the notion of criticality. The criticality of a Boolean function f : \0,1\n \0,1\ is the minimum λ ≥ 1 such that for all positive integers t, \[ Rp[DTdepth(f|) ≥ t] ≤ (pλ)t. \] H\"astad's celebrated switching lemma shows that the criticality of any k-DNF is at most O(k). Subsequent improvements to correlation bounds of AC0-circuits against parity showed that the criticality of any AC0-circuit of size S and depth d+1 is at most O( S)d and any regular AC0-formula of size S and depth d+1 is at most O(1d · S)d. We strengthen these results by showing that the criticality of any AC0-formula (not necessarily regular) of size S and depth d+1 is at most O(1d· S)d, resolving a conjecture due to Rossman. This result also implies Rossman's optimal lower bound on the size of any depth-d AC0-formula computing parity [Comput. Complexity, 27(2):209--223, 2018.]. Our result implies tight correlation bounds against parity, tight Fourier concentration results and improved \#SAT algorithm for AC0-formulae.

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