Bounded Independence Fools Halfspaces

Abstract

We show that any distribution on -1,1n that is k-wise independent fools any halfspace h with error for k = O(2(1/) /2). Up to logarithmic factors, our result matches a lower bound by Benjamini, Gurel-Gurevich, and Peled (2007) showing that k = (1/(2 · (1/))). Using standard constructions of k-wise independent distributions, we obtain the first explicit pseudorandom generators G: -1,1s --> -1,1n that fool halfspaces. Specifically, we fool halfspaces with error eps and seed length s = k n = O( n · 2(1/) /2). Our approach combines classical tools from real approximation theory with structural results on halfspaces by Servedio (Computational Complexity 2007).