Luby--Velickovi\'c--Wigderson revisited: Improved correlation bounds and pseudorandom generators for depth-two circuits

Abstract

We study correlation bounds and pseudorandom generators for depth-two circuits that consist of a SYM-gate (computing an arbitrary symmetric function) or THR-gate (computing an arbitrary linear threshold function) that is fed by S AND gates. Such circuits were considered in early influential work on unconditional derandomization of Luby, Velickovi\'c, and Wigderson [LVW93], who gave the first non-trivial PRG with seed length 2O((S/)) that -fools these circuits. In this work we obtain the first strict improvement of [LVW93]'s seed length: we construct a PRG that -fools size-S \SYM,THR\ AND circuits over \0,1\n with seed length \[ 2O( S ) + polylog(1/), \] an exponential (and near-optimal) improvement of the -dependence of [LVW93]. The above PRG is actually a special case of a more general PRG which we establish for constant-depth circuits containing multiple SYM or THR gates, including as a special case \SYM,THR\ AC0 circuits. These more general results strengthen previous results of Viola [Vio06] and essentially strengthen more recent results of Lovett and Srinivasan [LS11]. Our improved PRGs follow from improved correlation bounds, which are transformed into PRGs via the Nisan--Wigderson "hardness versus randomness" paradigm [NW94]. The key to our improved correlation bounds is the use of a recent powerful multi-switching lemma due to Hstad [Hs14].