Fooling intersections of low-weight halfspaces
Abstract
A weight- halfspace is a Boolean function sign where each is an integer in We give an explicit pseudorandom generator that -fools any intersection of weight- halfspaces with seed length poly. In particular, our result gives an explicit PRG that fools any intersection of any quasipoly number of halfspaces of any poly weight to any poly accuracy using seed length poly Prior to this work no explicit PRG with non-trivial seed length was known even for fooling intersections of weight-1 halfspaces to constant accuracy. The analysis of our PRG fuses techniques from two different lines of work on unconditional pseudorandomness for different kinds of Boolean functions. We extend the approach of Harsha, Klivans and Meka \cite{HKM12} for fooling intersections of regular halfspaces, and combine this approach with results of Bazzi \cite{Bazzi:07} and Razborov \cite{Razborov:09} on bounded independence fooling CNF formulas. Our analysis introduces new coupling-based ingredients into the standard Lindeberg method for establishing quantitative central limit theorems and associated pseudorandomness results.
Keywords
Cite
@article{arxiv.1704.04855,
title = {Fooling intersections of low-weight halfspaces},
author = {Rocco A. Servedio and Li-Yang Tan},
journal= {arXiv preprint arXiv:1704.04855},
year = {2017}
}
Comments
27 pages