Optimal Error Pseudodistributions for Read-Once Branching Programs

Abstract

In a seminal work, Nisan (Combinatorica'92) constructed a pseudorandom generator for length n and width w read-once branching programs with seed length O( n· (nw)+ n·(1/)) and error . It remains a central question to reduce the seed length to O( (nw/)), which would prove that BPL=L. However, there has been no improvement on Nisan's construction for the case n=w, which is most relevant to space-bounded derandomization. Recently, in a beautiful work, Braverman, Cohen and Garg (STOC'18) introduced the notion of a pseudorandom pseudo-distribution (PRPD) and gave an explicit construction of a PRPD with seed length O( n· (nw)+(1/)). A PRPD is a relaxation of a pseudorandom generator, which suffices for derandomizing BPL and also implies a hitting set. Unfortunately, their construction is quite involved and complicated. Hoza and Zuckerman (FOCS'18) later constructed a much simpler hitting set generator with seed length O( n· (nw)+(1/)), but their techniques are restricted to hitting sets. In this work, we construct a PRPD with seed length O( n· (nw)· (nw)+(1/)). This improves upon the construction in [BCG18] by a O((1/)) factor, and is optimal in the small error regime. In addition, we believe our construction and analysis to be simpler than the work of Braverman, Cohen and Garg.