Improved Pseudorandom Generators for AC0 Circuits

Abstract

We show a new PRG construction fooling depth-d, size-m AC0 circuits within error , which has seed length O(d-1(m)(m/)(m)). Our PRG improves on previous work (Trevisan and Xue 2013, Servedio and Tan 2019, Kelley 2021) from various aspects. It has optimal dependence on 1 and is only one ``(m)'' away from the lower bound barrier. For the case of d=2, the seed length tightly matches the best-known PRG for CNFs (De et al. 2010, Tal 2017). There are two technical ingredients behind our new result; both of them might be of independent interest. First, we use a partitioning-based approach to construct PRGs based on restriction lemmas for AC0, which follows and extends the seminal work of (Ajtai and Wigderson 1989). Second, improving and extending prior works (Trevisan and Xue 2013, Servedio and Tan 2019, Kelley 2021), we prove a full derandomization of the powerful multi-switching lemma for a family of DNFs (Hstad 2014).