Improved pseudorandom generators from pseudorandom multi-switching lemmas

Abstract

We give the best known pseudorandom generators for two touchstone classes in unconditional derandomization: an -PRG for the class of size-M depth-d AC0 circuits with seed length (M)d+O(1)· (1/), and an -PRG for the class of S-sparse F2 polynomials with seed length 2O( S)· (1/). These results bring the state of the art for unconditional derandomization of these classes into sharp alignment with the state of the art for computational hardness for all parameter settings: improving on the seed lengths of either PRG would require breakthrough progress on longstanding and notorious circuit lower bounds. The key enabling ingredient in our approach is a new pseudorandom multi-switching lemma. We derandomize recently-developed multi-switching lemmas, which are powerful generalizations of Hstad's switching lemma that deal with families of depth-two circuits. Our pseudorandom multi-switching lemma---a randomness-efficient algorithm for sampling restrictions that simultaneously simplify all circuits in a family---achieves the parameters obtained by the (full randomness) multi-switching lemmas of Impagliazzo, Matthews, and Paturi [IMP12] and Hstad [Hs14]. This optimality of our derandomization translates into the optimality (given current circuit lower bounds) of our PRGs for AC0 and sparse F2 polynomials.